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[1] M. L. Cartwright :
“The application of Abel’s method of summation to Dirichlet’s series J. Lond. Math. Soc.
3 : 4
(1928 ),
pp. 262–267 .
MR
1574006 article
Abstract
BibTeX
A series \( \sum a_n \) may be said to be summable by Abel’s method in an angle \( 2\alpha \) , or summable \( (A_{\alpha}) \) , to sum \( l \) , if \( \sum a_ne^{-ny} \) is convergent for all positive values of \( y \) , and
\[ \phi(y) = \sum a_n e^{-ny}\to l, \]
when \( y\to 0 \) inside and on the boundary of the angle \( -\alpha\leq \arg y\leq\alpha \) , where \( \alpha < \pi/2 \) .
If \( \phi(y)\to l \) when \( y\to 0 \) along the real axis, the series is said to be summable \( (A) \) .
I propose to discuss the application of this method of summation to the ordinary Dirichlet’s series \( \sum a_n n^{-s} \) .
@article {key1574006m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The application of {A}bel's method of
summation to {D}irichlet's series},
JOURNAL = {J. Lond. Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society},
VOLUME = {3},
NUMBER = {4},
YEAR = {1928},
PAGES = {262--267},
DOI = {10.1112/jlms/s1-3.4.262},
NOTE = {MR:1574006.},
ISSN = {0024-6107},
}
[2] M. L. Cartwright :
“On the relation between the functions represented by a power series and its associated Dirichlet’s series J. Lond. Math. Soc.
4 : 2
(1929 ),
pp. 96–100 .
JFM
55.0201.02 article
Abstract
BibTeX
If, near \( x-1 \) , the function \( f(x) \) can be expressed in the form
\[ (1-x)^{-c}\Bigl(\log\frac{1}{1-x}\Bigr)^{\alpha - 1}\phi(x), \]
where \( \phi(x) \) is regular at \( x = 1 \) , and \( \alpha \) is any number except a negative integer or zero, then the function \( F(s) \) is regular in any finite half-plane \( \rho > -\beta \) , except for poles at \( s = c \) , \( c-1 \) , \( c-2,\dots \) , and in that region ihe function \( F(s) \) can be expressed in the form.
\[ \frac{1}{\Gamma(s)}\Bigl\{ \sum_{m=0}^r \sum_{p=0}^m \frac{A_{m,p}\Gamma(\alpha - p)}{(s - c + m)^{\alpha - p}} + \Psi(s)\Bigr\}, \]
where \( \Psi(s) \) is regular for \( \rho > -\beta \) and \( R(c) - r - 1 \leq \beta < R(c) - r \)
@article {key55.0201.02j,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the relation between the functions
represented by a power series and its
associated {D}irichlet's series},
JOURNAL = {J. Lond. Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society},
VOLUME = {4},
NUMBER = {2},
YEAR = {1929},
PAGES = {96--100},
DOI = {10.1112/jlms/s1-4.14.96},
NOTE = {JFM:55.0201.02.},
ISSN = {0024-6107},
}
[3] M. L. Cartwright :
“The zeros of certain integral functions Q. J. Math., Oxf. Ser.
1 : 1
(1930 ),
pp. 38–59 .
JFM
56.0973.02 article
Abstract
BibTeX
I propose to consider functions of the form
\begin{equation*}\tag{1} f(z) = f(x+iy) = f(re^{i\theta}) = \int_a^b e^{it} \phi(t) \,dt, \end{equation*}
where \( \phi(t) \) is a complex function, integrable in the sense of Lebesgue. The functions
\begin{align*} U(z) &= \int_a^b \cos zt u(t)\,dt,\\ V(z) &= \int_a^b \sin zt v(t)\,dt \end{align*}
may be reduced to the form (1) by simple transformations. Among them are many well-known functions such as Bessel functions.
The problem here is to determine approximately the total number of zeros, and the position of the zeros for which \( r \) is large.
My object here is to prove a number of theorems intermediate in generality between those of Titchmarsh and Hardy.
@article {key56.0973.02j,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The zeros of certain integral functions},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {1},
NUMBER = {1},
YEAR = {1930},
PAGES = {38--59},
DOI = {10.1093/qmath/os-1.1.38},
NOTE = {JFM:56.0973.02.},
ISSN = {0033-5606},
}
[4] M. L. Cartwright :
“On the relation between the different types of Abel summation Proc. London Math. Soc. (2)
31 : 1
(1930 ),
pp. 81–96 .
MR
1577487 JFM
56.0908.01 article
Abstract
BibTeX
Suppose that the series \( \sum_1^\infty a_n e^{-yn^{\nu}} \) , where \( \nu > 0 \) , is convergent for \( R(y) > 0 \) , so that it defines an analytic function \( \phi_{\nu}(y) = \phi_{\nu}(re^{i\theta}) \) regular in the right half-plane; and suppose further that
\[ \phi_{\nu}(y) \to l \]
when \( y\to 0 \) so that \( -\alpha\leq\theta\leq\alpha \) , where \( 0\leq\alpha < \frac{1}{2}\pi \) ; then the series \( \sum a_n \) is said to be summable \( (A_{\alpha},\nu) \) to sum \( l \) . It is sufficient to assume that \( \phi_{\nu}(y)\to l \) when \( y\to 0 \) on \( \theta = \alpha \) and \( \theta = -\alpha \) , and that \( \phi_{\nu}(y) \) is bounded in the angle \( -\alpha\leq\theta\leq\alpha \) , for then, by a theorem due to Lindelöf [1909], \( \phi_{\nu}(y)\to l \) uniformly, when \( y\to 0 \) so that \( -\alpha\leq\theta\leq\alpha \) .
The chief object of this paper is to show that if \( \sum a_n \) is summable \( (A_{\alpha},\nu) \) , and if \( \sum a_n e^{-yn^{\mu}} \) is convergent for \( R(y) > 0 \) , then \( \sum a_n \) is summable \( (A_{\beta}, \mu) \) , provided that
\[ \beta < \tfrac{1}{2}\pi - (\tfrac{1}{2}\pi - \alpha) \mu/\nu \]
but I shall also prove several other theorems connecting the series \( \sum a_ne^{-yn^{\nu}} \) and \( \sum a_ne^{-yn^{\mu}} \) .
@article {key1577487m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the relation between the different
types of {A}bel summation},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {31},
NUMBER = {1},
YEAR = {1930},
PAGES = {81--96},
DOI = {10.1112/plms/s2-31.1.81},
NOTE = {MR:1577487. JFM:56.0908.01.},
ISSN = {0024-6115},
}
[5] M. L. Cartwright :
“On the maximum modulus principle for functions with zeros and poles Proc. London Math. Soc. (2)
32 : 1
(1931 ),
pp. 51–71 .
MR
1576004 JFM
56.0269.01 article
BibTeX
@article {key1576004m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the maximum modulus principle for
functions with zeros and poles},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {32},
NUMBER = {1},
YEAR = {1931},
PAGES = {51--71},
DOI = {10.1112/plms/s2-32.1.51},
NOTE = {MR:1576004. JFM:56.0269.01.},
ISSN = {0024-6115},
}
[6] M. L. Cartwright :
“On integral functions of integral order Proc. London Math. Soc. (2)
33 : 1
(1931 ),
pp. 209–224 .
See also the similarly titled research report in Brit. Assoc. Rep. 99 (1932)
MR
1576826 JFM
57.0362.01 Zbl
0003.21102 article
Abstract
BibTeX
The object of this paper is to consider the behaviour of the series
\begin{equation*}\tag{1} \sum_1^{\infty}\frac{1}{z_n^{\rho}}. \end{equation*}
The general conclusion is that, if \( f(z) \) is of minimum type or even a very smooth function of mean type, then (1) is convergent, and we may write \( f(z) \) in the form (1) although the product may be only conditionally convergent. Even when (1) is not convergent we can often find quite narrow limits for the oscillation of the partial sums; and for certain functions of mean type the behaviour of the function is dominated by the behaviour of the partial sums of (1).
@article {key1576826m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On integral functions of integral order},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {33},
NUMBER = {1},
YEAR = {1931},
PAGES = {209--224},
DOI = {10.1112/plms/s2-33.1.209},
NOTE = {See also the similarly titled research
report in \textit{Brit. Assoc. Rep.}
\textbf{99} (1932). MR:1576826. Zbl:0003.21102.
JFM:57.0362.01.},
ISSN = {0024-6115},
}
[7] M. L. Cartwright :
“The zeros of certain integral functions, II Q. J. Math., Oxf. Ser.
2 : 1
(1931 ),
pp. 113–129 .
JFM
57.0361.03 Zbl
0002.19601 article
BibTeX
@article {key0002.19601z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The zeros of certain integral functions,
{II}},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {2},
NUMBER = {1},
YEAR = {1931},
PAGES = {113--129},
DOI = {10.1093/qmath/os-2.1.113},
NOTE = {Zbl:0002.19601. JFM:57.0361.03.},
ISSN = {0033-5606},
}
[8] M. L. Cartwright :
“The zeros of the cardinal function of interpolation J. London Math. Soc.
6 : 4
(1931 ),
pp. 252–257 .
MR
1574626 JFM
57.0347.02 Zbl
0003.11002 article
BibTeX
@article {key1574626m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The zeros of the cardinal function of
interpolation},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {The Journal of the London Mathematical
Society},
VOLUME = {6},
NUMBER = {4},
YEAR = {1931},
PAGES = {252--257},
DOI = {10.1112/jlms/s1-6.4.252},
NOTE = {MR:1574626. Zbl:0003.11002. JFM:57.0347.02.},
ISSN = {0024-6107},
}
[9] M. L. Cartwright :
“Integral functions of integral order ,”
Brit. Assoc. Rep.
99
(1932 ),
pp. 341–342 .
See also similarly titled article in Proc. London Math. Soc. 33 :1 (1931)
JFM
58.0354.13 article
BibTeX
@article {key58.0354.13j,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Integral functions of integral order},
JOURNAL = {Brit. Assoc. Rep.},
FJOURNAL = {British Association Reports},
VOLUME = {99},
YEAR = {1932},
PAGES = {341--342},
NOTE = {See also similarly titled article in
\textit{Proc. London Math. Soc.} \textbf{33}:1
(1931). JFM:58.0354.13.},
}
[10] M. L. Cartwright :
“Sur quelques propriétés des directions de Borel des fonctions entières d’ordre fini ”
[On some properties of directions of Borel of entire functions of finite order ],
C. R. Acad. Sci., Paris
194
(1932 ),
pp. 2120–2122 .
JFM
58.0341.01 Zbl
0004.40303 article
BibTeX
@article {key0004.40303z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Sur quelques propri\'et\'es des directions
de {B}orel des fonctions enti\`eres
d'ordre fini [On some properties of
directions of {B}orel of entire functions
of finite order]},
JOURNAL = {C. R. Acad. Sci., Paris},
FJOURNAL = {Comptes Rendus Hebdomadaires des S\'eances
de l'Acad\'emie des Sciences, Paris},
VOLUME = {194},
YEAR = {1932},
PAGES = {2120--2122},
NOTE = {Zbl:0004.40303. JFM:58.0341.01.},
ISSN = {0001-4036},
}
[11] M. L. Cartwright :
“On functions regular in the unit circle 47–48
in
Verhandlungen des Internationalen Mathematiker-Kongresses Zürich 1932
[Proceedings of the International Congress of Mathematicians Zürich 1932 ]
(Zürich, 5–12 September 1932 ),
vol. 2 .
Edited by W. Saxner .
Orell Füssli Verlag (Zürich and Leipzig ),
1932 .
JFM
58.0353.16 incollection
People
BibTeX
@incollection {key58.0353.16j,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On functions regular in the unit circle},
BOOKTITLE = {Verhandlungen des {I}nternationalen
{M}athematiker-{K}ongresses {Z}\"urich
1932 [Proceedings of the {I}nternational
{C}ongress of {M}athematicians {Z}\"urich
1932]},
EDITOR = {Saxner, Walter},
VOLUME = {2},
PUBLISHER = {Orell F\"ussli Verlag},
ADDRESS = {Z\"urich and Leipzig},
YEAR = {1932},
PAGES = {47--48},
URL = {http://www.mathunion.org/ICM/ICM1932.2/Main/icm1932.2.0047.0048.ocr.pdf},
NOTE = {(Z\"urich, 5--12 September 1932). JFM:58.0353.16.},
}
[12] M. L. Cartwright :
“Sur les directions de Borel des fonctions entières d’ordre fini ”
[On the directions of Borel of entire functions of finite order ],
C. R. Acad. Sci., Paris
194
(1932 ),
pp. 1889–1892 .
JFM
58.0340.02 Zbl
0004.40302 article
BibTeX
@article {key0004.40302z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Sur les directions de {B}orel des fonctions
enti\`eres d'ordre fini [On the directions
of {B}orel of entire functions of finite
order]},
JOURNAL = {C. R. Acad. Sci., Paris},
FJOURNAL = {Comptes Rendus Hebdomadaires des S\'eances
de l'Acad\'emie des Sciences, Paris},
VOLUME = {194},
YEAR = {1932},
PAGES = {1889--1892},
NOTE = {Zbl:0004.40302. JFM:58.0340.02.},
ISSN = {0001-4036},
}
[13] M. L. Cartwright :
“Sur certaines fonctions entières d’ordre fini ”
[On certain entire functions of finite order ],
C. R. Acad. Sci., Paris
194
(1932 ),
pp. 1718–1720 .
JFM
58.0340.01 Zbl
0004.40301 article
BibTeX
@article {key0004.40301z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Sur certaines fonctions enti\`eres d'ordre
fini [On certain entire functions of
finite order]},
JOURNAL = {C. R. Acad. Sci., Paris},
FJOURNAL = {Comptes Rendus Hebdomadaires des S\'eances
de l'Acad\'emie des Sciences, Paris},
VOLUME = {194},
YEAR = {1932},
PAGES = {1718--1720},
NOTE = {Zbl:0004.40301. JFM:58.0340.01.},
ISSN = {0001-4036},
}
[14] M. L. Cartwright :
“Sur la rélation entre les directions de Borel de certaines fonctions entières et les singularites des fonctions analytiques ”
[On the relation between the directions of Borel of certain entire functions and the singularities of analytic functions ],
C. R. Acad. Sci., Paris
194
(1932 ),
pp. 2280–2282 .
JFM
58.0338.03 Zbl
0004.40304 article
BibTeX
@article {key0004.40304z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Sur la r\'elation entre les directions
de {B}orel de certaines fonctions enti\`eres
et les singularites des fonctions analytiques
[On the relation between the directions
of {B}orel of certain entire functions
and the singularities of analytic functions]},
JOURNAL = {C. R. Acad. Sci., Paris},
FJOURNAL = {Comptes Rendus Hebdomadaires des S\'eances
de l'Acad\'emie des Sciences, Paris},
VOLUME = {194},
YEAR = {1932},
PAGES = {2280--2282},
NOTE = {Zbl:0004.40304. JFM:58.0338.03.},
ISSN = {0001-4036},
}
[15] L. S. Bosanquet and M. L. Cartwright :
“On the Hölder and Cesàro means of an analytic function Math. Z.
37 : 1
(1933 ),
pp. 170–192 .
MR
1545389 JFM
59.0319.01 Zbl
0007.16802 article
People
BibTeX
@article {key1545389m,
AUTHOR = {Bosanquet, L. S. and Cartwright, M.
L.},
TITLE = {On the {H}\"older and {C}es\`aro means
of an analytic function},
JOURNAL = {Math. Z.},
FJOURNAL = {Mathematische Zeitschrift},
VOLUME = {37},
NUMBER = {1},
YEAR = {1933},
PAGES = {170--192},
DOI = {10.1007/BF01474569},
NOTE = {MR:1545389. Zbl:0007.16802. JFM:59.0319.01.},
ISSN = {0025-5874},
CODEN = {MAZEAX},
}
[16] M. L. Cartwright :
“On analytic functions regular in the unit circle ,”
Q. J. Math., Oxf. Ser.
4 : 1
(1933 ),
pp. 246–257 .
JFM
59.0325.01 Zbl
0008.11803 article
BibTeX
@article {key0008.11803z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On analytic functions regular in the
unit circle},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {4},
NUMBER = {1},
YEAR = {1933},
PAGES = {246--257},
NOTE = {Zbl:0008.11803. JFM:59.0325.01.},
ISSN = {0033-5606},
}
[17] L. S. Bosanquet and M. L. Cartwright :
“Some Tauberian theorems Math. Z.
37 : 1
(1933 ),
pp. 416–423 .
MR
1545404 JFM
59.0235.03 Zbl
0007.34502 article
People
BibTeX
@article {key1545404m,
AUTHOR = {Bosanquet, L. S. and Cartwright, M.
L.},
TITLE = {Some {T}auberian theorems},
JOURNAL = {Math. Z.},
FJOURNAL = {Mathematische Zeitschrift},
VOLUME = {37},
NUMBER = {1},
YEAR = {1933},
PAGES = {416--423},
DOI = {10.1007/BF01474584},
NOTE = {MR:1545404. Zbl:0007.34502. JFM:59.0235.03.},
ISSN = {0025-5874},
CODEN = {MAZEAX},
}
[18] M. L. Cartwright :
“On the minimum modulus of integral functions Proc. Camb. Philos. Soc.
30 : 4
(October 1934 ),
pp. 412–420 .
JFM
60.0262.03 Zbl
0010.12201 article
BibTeX
@article {key0010.12201z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the minimum modulus of integral functions},
JOURNAL = {Proc. Camb. Philos. Soc.},
FJOURNAL = {Proceedings of the Cambridge Philosophical
Society},
VOLUME = {30},
NUMBER = {4},
MONTH = {October},
YEAR = {1934},
PAGES = {412--420},
DOI = {10.1017/S0305004100012652},
NOTE = {Zbl:0010.12201. JFM:60.0262.03.},
ISSN = {0008-1981},
}
[19] M. L. Cartwright :
“Mayer’s method of solving the equation \( dz=P\,dx+Q\,dy \) Math. Gaz.
18 : 228
(May 1934 ),
pp. 105–107 .
JFM
60.1126.02 Zbl
0008.39205 article
Abstract
BibTeX
It has been pointed out [Underwood 1934] that Mayer’s method of solving the differential equation
\[ dz = P(x,y,z)\,dx + Q(x,y,z)\,dy \]
is quite general and only requires one integration, whereas the other general mehtods require two, or even three, integrations. The reason for this is rather obscure in most text-books; and the proof of the validity of the method rests on an existence theorem which leads to a solution of an apparently different form. I shall prove here that the two forms are identical.
@article {key0008.39205z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Mayer's method of solving the equation
\$dz=P\,dx+Q\,dy\$},
JOURNAL = {Math. Gaz.},
FJOURNAL = {The Mathematical Gazette},
VOLUME = {18},
NUMBER = {228},
MONTH = {May},
YEAR = {1934},
PAGES = {105--107},
URL = {http://www.jstor.org/stable/3605622},
NOTE = {Zbl:0008.39205. JFM:60.1126.02.},
ISSN = {0025-5572},
}
[20] M. L. Cartwright :
“On analytic functions regular in the unit circle, II Q. J. Math., Oxf. Ser.
6 : 1
(1935 ),
pp. 94–105 .
JFM
61.0308.02 Zbl
0011.35803 article
Abstract
BibTeX
Let \( f(z) = f(re^{i\theta}) = u(r,\theta) + iv(r,\theta) \) be regular for \( |z| < 1 \) , and let \( f(0) = 0 \) . We write
\begin{align*} M(r) &= \max_{0\leq\theta < 2\pi}|f(re^{i\theta})|,\\ M_p(r,u) &= \Bigl\{ \frac{1}{2\pi}\int_0^{2\pi}|u(r,\theta)|^p d\theta \Bigr\}^{1/p} \quad (p > 0), \end{align*}
and \( u_{+}(r,\theta) = u(r,\theta) \) (\( u > 0 \) ), \( u_{+}(r,\theta) = 0 \) otherwise. In an earlier paper [1933] I showed that, if
\[ u_{+}(r,\theta) < A(1-r)^{-\alpha}\quad (r < 1;\ \alpha > 0), \]
then, for \( r < 1 \) ,
\begin{align*} M(r) & < K(\alpha)A(1-r)^{-1} \quad (\alpha < 1),\\ M(r) & < KA(1-r)^{-1}\Bigl( \log\frac{1}{1-r} \Bigr)^2 \quad (\alpha = 1),\\ M(r) & < K(\alpha)A(1-r)^{-\alpha} \quad (\alpha > 1). \end{align*}
The chief object of this paper is to prove a similar result for \( M_p(r,u_{+}) \) and \( M_p(r,f) \) , where \( p\geq 1 \) .
@article {key0011.35803z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On analytic functions regular in the
unit circle, {II}},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {6},
NUMBER = {1},
YEAR = {1935},
PAGES = {94--105},
DOI = {10.1093/qmath/os-6.1.94},
NOTE = {Zbl:0011.35803. JFM:61.0308.02.},
ISSN = {0033-5606},
}
[21] M. L. Cartwright :
“On functions which are regular and of finite order in an angle Proc. London Math. Soc. (2)
38 : 1
(1935 ),
pp. 158–179 .
MR
1576310 JFM
60.0262.01 Zbl
0010.12104 article
Abstract
BibTeX
Suppose that \( f(z) \) is regular and of finite positive order \( \rho \) in the angle \( \alpha\leq \arg z \leq\beta \) for \( |z| \geq l > 0 \) . Let \( \rho(r) \) be the Lindelöf proximate order of any integral function of order \( \rho \) , and let
\[ h(\theta) = \overline{\lim_{r\to\infty}}\frac{\log|f(re^{i\theta})|}{r^{\rho(r)}}. \]
The object of this paper is to deduce something about the zeros, and the behaviour of \( f(z) \) in general, from the form of \( h(\theta) \) when
\[ h(\theta) = A\cos\theta_{\rho}+B\sin\theta_{\rho} \]
where \( A \) and \( B \) are finite.
@article {key1576310m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On functions which are regular and of
finite order in an angle},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {38},
NUMBER = {1},
YEAR = {1935},
PAGES = {158--179},
DOI = {10.1112/plms/s2-38.1.158},
NOTE = {MR:1576310. Zbl:0010.12104. JFM:60.0262.01.},
ISSN = {0024-6115},
}
[22] M. L. Cartwright :
“On the directions of Borel of functions which are regular and of finite order in an angle Proc. London Math. Soc. (2)
38 : 1
(1935 ),
pp. 503–541 .
MR
1576331 JFM
61.0339.03 Zbl
0011.31105 article
BibTeX
@article {key1576331m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the directions of {B}orel of functions
which are regular and of finite order
in an angle},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {38},
NUMBER = {1},
YEAR = {1935},
PAGES = {503--541},
DOI = {10.1112/plms/s2-38.1.503},
NOTE = {MR:1576331. Zbl:0011.31105. JFM:61.0339.03.},
ISSN = {0024-6115},
}
[23] M. L. Cartwright :
“On the directions of Borel of analytic functions Proc. London Math. Soc. (2)
38 : 1
(1935 ),
pp. 417–457 .
MR
1576326 JFM
61.0339.02 Zbl
0010.40407 article
BibTeX
@article {key1576326m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On the directions of {B}orel of analytic
functions},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {38},
NUMBER = {1},
YEAR = {1935},
PAGES = {417--457},
DOI = {10.1112/plms/s2-38.1.417},
NOTE = {MR:1576326. Zbl:0010.40407. JFM:61.0339.02.},
ISSN = {0024-6115},
}
[24] M. L. Cartwright :
“Some inequalities in the theory of functions Math. Ann.
111 : 1
(1935 ),
pp. 98–118 .
MR
1512983 JFM
61.0351.02 Zbl
0010.36203 article
Abstract
BibTeX
Suppose that
\[ w(z) = a_0 + a_1 z + a_2 z^2 + \cdots \]
is regular for \( |z| = r < 1 \) . It was first proved by Koebe [1909] that if \( w(z) \) is schlicht in the unit circle, and if \( a_0 = 0 \) , \( a_1 = 1 \) , then
\[ |w(z)| \leq \phi(r)\qquad (0 < r < 1), \]
where \( \phi \) is a function of \( r \) only . It was afterwards proved by Bieberbach [1927] that under these conditions
\[ |w(z)| \leq \frac{r}{(1-r)^2}, \]
and further results were proved by Littlewood [1925] for mean values of \( |w(z)| \) and for \( |a_n| \) . Bieberbach’s result is the best possible, as is shown by the function
\[ w(z) = \frac{z}{(1-z)^2}, \]
which takes every value, except those on the negative real axis between \( -1/4 \) and \( \infty \) once, and once only.
The object of this paper is to prove similar results for functions which only take values \( p \) times, by methods differing fundamentally from those of previous writers on the subject.
@article {key1512983m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Some inequalities in the theory of functions},
JOURNAL = {Math. Ann.},
FJOURNAL = {Mathematische Annalen},
VOLUME = {111},
NUMBER = {1},
YEAR = {1935},
PAGES = {98--118},
DOI = {10.1007/BF01472208},
NOTE = {MR:1512983. Zbl:0010.36203. JFM:61.0351.02.},
ISSN = {0025-5831},
CODEN = {MAANA},
}
[25] M. L. Cartwright :
“Some generalizations of Montel’s theorem Proc. Camb. Philos. Soc.
31 : 1
(1935 ),
pp. 26–30 .
JFM
61.0307.02 Zbl
0011.02908 article
BibTeX
@article {key0011.02908z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Some generalizations of {M}ontel's theorem},
JOURNAL = {Proc. Camb. Philos. Soc.},
FJOURNAL = {Proceedings of the Cambridge Philosophical
Society},
VOLUME = {31},
NUMBER = {1},
YEAR = {1935},
PAGES = {26--30},
DOI = {10.1017/S0305004100012901},
NOTE = {Zbl:0011.02908. JFM:61.0307.02.},
ISSN = {0008-1981},
}
[26] M. L. Cartwright :
“On certain integral functions of order 1 and mean type Proc. Camb. Philos. Soc.
31 : 3
(August 1935 ),
pp. 347–350 .
Zbl
0012.17106 article
Abstract
BibTeX
The object of this note is to show the relation between certain results obtained by Wiener and Paley [1934], and by Levinson [1935] from the theory of Fourier transforms, and a theorem which I proved in a recent paper.
@article {key0012.17106z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On certain integral functions of order
1 and mean type},
JOURNAL = {Proc. Camb. Philos. Soc.},
FJOURNAL = {Proceedings of the Cambridge Philosophical
Society},
VOLUME = {31},
NUMBER = {3},
MONTH = {August},
YEAR = {1935},
PAGES = {347--350},
DOI = {10.1017/S0305004100013116},
NOTE = {Zbl:0012.17106.},
ISSN = {0008-1981},
}
[27] M. L. Cartwright :
“On certain integral functions of order one Q. J. Math., Oxf. Ser.
7 : 1
(1936 ),
pp. 46–55 .
JFM
62.0354.01 Zbl
0013.35802 article
BibTeX
@article {key0013.35802z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On certain integral functions of order
one},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {7},
NUMBER = {1},
YEAR = {1936},
PAGES = {46--55},
DOI = {10.1093/qmath/os-7.1.46},
NOTE = {Zbl:0013.35802. JFM:62.0354.01.},
ISSN = {0033-5606},
}
[28] M. L. Cartwright :
“Some uniqueness theorems Proc. London Math. Soc. (2)
41 : 1
(1936 ),
pp. 33–47 .
MR
1575454 JFM
62.0330.01 Zbl
0013.21202 article
Abstract
BibTeX
Let \( \phi(z) \) be regular for \( |z| < 1 \) , and \( \psi(z) \) for \( |z| > 1 \) . Suppose that \( \psi(z) \) is continuous on \( |z| = 1 \) , and that the boundary values of \( \phi(z) \) and \( \psi(z) \) coincide on a certain arc of \( |z| = 1 \) . Then \( \psi(z) \) is the analytical continuation of \( \phi(z) \) outside \( |z|= 1 \) , and if the boundary values coincide at all points on \( |z| = 1 \) , the function is regular at all points on \( |z| = 1 \) . Since \( \psi(z) \) is regular outside \( |z| = 1 \) , we have a function which is regular everywhere, and therefore reduces to a constant. The object of this paper is to discuss certain cases in which the coincidence of the boundary values on an arc of \( |z| = 1 \) implies that \( \phi(z) = \psi(z) = \) a constant. The theorems were suggested by a theorem of Levinson, and some theorems of Mandelbrojt.
@article {key1575454m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Some uniqueness theorems},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {41},
NUMBER = {1},
YEAR = {1936},
PAGES = {33--47},
DOI = {10.1112/plms/s2-41.1.33},
NOTE = {MR:1575454. Zbl:0013.21202. JFM:62.0330.01.},
ISSN = {0024-6115},
}
[29] M. L. Cartwright :
“On the asymptotic values of functions with a non-enumerable set of essential singularities J. London Math. Soc.
11 : 4
(1936 ),
pp. 303–306 .
MR
1574930 JFM
62.0363.01 Zbl
0015.16502 article
Abstract
BibTeX
A set is said to be of logarithmic measure zero if for every \( \varepsilon > 0 \) there exists a sequence of circles with radii \( \rho_1, \rho_2,\dots \) , covering the set, such that
\[ \sum_{\nu=1}^{\infty}[\log^+(1/\rho_{\nu})]^{-1} < \varepsilon \]
Suppose that \( f(z) \) is meromorphic in an open simply connected domain \( D \) , except for a set \( E \) of essential singularities of logarithmic measure zero. If \( f(z) \neq a \) near an essential singularity \( Z \) , then, for every \( \delta > 0 \) , \( f(z)\to a \) as \( z \) tends to some singularity in \( |z - Z| < \delta \) along a continuous path.
In other words \( a \) is an asymptotic value of \( f(z) \) at some singularity in every circle \( |z-Z| < \delta \) .
@article {key1574930m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On the asymptotic values of functions
with a non-enumerable set of essential
singularities},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {The Journal of the London Mathematical
Society},
VOLUME = {11},
NUMBER = {4},
YEAR = {1936},
PAGES = {303--306},
DOI = {10.1112/jlms/s1-11.4.303},
NOTE = {MR:1574930. Zbl:0015.16502. JFM:62.0363.01.},
ISSN = {0024-6107},
}
[30] M. L. Cartwright :
“On the behaviour of an analytic function in the neighbourhood of its essential singularities Math. Ann.
112 : 1
(1936 ),
pp. 161–186 .
MR
1513045 JFM
62.0364.02 Zbl
0013.06902 article
Abstract
BibTeX
Suppose that \( f(z) \) is a one-valued function, meromorphic in a connected region \( D \) , and having an essential singularity at a point \( z=Z \) on the boundary of \( D \) . We associate with \( Z \) three sets of values:
The cluster set \( C_D(Z) \) of \( f(z) \) at \( Z \) . This is the set of values \( a \) such that
\[ \lim_{n\to\infty}f(z_n) = a, \]
where \( z_1 \) , \( z_2,\dots \) is a sequence of points tending to \( Z \) inside \( D \) ;
The range of values \( R_D(Z) \) of \( f(z) \) at \( Z \) . A value \( a \) belongs to \( R_D(Z) \) if, and only if, \( f(z) \) takes the value \( a \) an infinity of times near \( Z \) inside \( D \) ;
The convergence set \( \Gamma_D(Z) \) of \( f(z) \) at \( Z \) . This is the set of all values \( a \) such that
\[ \lim_{z\to Z}f(z) = a, \]
as \( z\to Z \) along a Jordan arc lying inside \( D \) except for the end point at \( Z \) .
If \( D \) is the unit circle, we write simply \( C(Z) \) , \( R(Z) \) , \( \Gamma(Z) \) .
The object of this paper is to discuss the sets \( C_D(Z) \) , \( R_D(Z) \) , and \( \Gamma_D(Z) \) taken over a set of non-isolated essential singularities; in particular we shall consider the measure of the sets \( R_D(Z) \) and \( \Gamma_D(Z) \) , and the relation between \( R_D(Z) \) and \( \Gamma_D(Z) \) .
@article {key1513045m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On the behaviour of an analytic function
in the neighbourhood of its essential
singularities},
JOURNAL = {Math. Ann.},
FJOURNAL = {Mathematische Annalen},
VOLUME = {112},
NUMBER = {1},
YEAR = {1936},
PAGES = {161--186},
DOI = {10.1007/BF01565413},
NOTE = {MR:1513045. Zbl:0013.06902. JFM:62.0364.02.},
ISSN = {0025-5831},
CODEN = {MAANA},
}
[31] M. L. Cartwright :
“The exceptional values of functions with a non-enumerable set of essential singularities Q. J. Math., Oxf. Ser.
8 : 1
(1937 ),
pp. 303–307 .
JFM
63.0284.03 Zbl
0017.40804 article
Abstract
BibTeX
Let \( f(z) \) be a function which is meromorphic in an open domain \( D \) except for a set \( E \) of essential singularities. The object of this paper is to prove the following theorem and to discuss its relation to other known theorems of a similar type.
The set \( E \) is of linear measure zero, then \( f(z) \) takes all valves except perhaps a set of plane measure zero near each point of \( E \) .
It is easy to see that, if \( E \) is of positive linear measure, \( f(z) \) may omit a set of positive plane measure, in fact \( f(z) \) may omit a whole region of the complex plane. I shall discuss later how far the result can be improved when \( E \) is of linear measure zero. The proof depends on the theory of minimal slit regions, and the complete result obtained can only be stated in terms of slit regions.
@article {key0017.40804z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The exceptional values of functions
with a non-enumerable set of essential
singularities},
JOURNAL = {Q. J. Math., Oxf. Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford Series},
VOLUME = {8},
NUMBER = {1},
YEAR = {1937},
PAGES = {303--307},
DOI = {10.1093/qmath/os-8.1.303},
NOTE = {Zbl:0017.40804. JFM:63.0284.03.},
ISSN = {0033-5606},
}
[32] M. L. Cartwright :
“On analytic functions with non-isolated essential singularities 72
in
Comptes rendus du Congrès International des Mathématiciens Oslo, 1936
[Proceedings of the International Congress of Mathematicians Oslo, 1936 ]
(Oslo, 13–18 July 1936 ),
vol. 2 .
A. W. Brøggers Bogtrykkeri (Oslo ),
1937 .
JFM
63.0285.02 incollection
BibTeX
@incollection {key63.0285.02j,
AUTHOR = {Cartwright, Mary L.},
TITLE = {On analytic functions with non-isolated
essential singularities},
BOOKTITLE = {Comptes rendus du {C}ongr\`es {I}nternational
des {M}ath\'ematiciens {O}slo, 1936
[Proceedings of the {I}nternational
{C}ongress of {M}athematicians {O}slo,
1936]},
VOLUME = {2},
PUBLISHER = {A. W. Br\o ggers Bogtrykkeri},
ADDRESS = {Oslo},
YEAR = {1937},
PAGES = {72},
URL = {http://www.mathunion.org/ICM/ICM1936.2/Main/icm1936.2.0072.0073.ocr.pdf},
NOTE = {(Oslo, 13--18 July 1936). JFM:63.0285.02.},
}
[33] M. L. Cartwright :
“On functions bounded at the lattice points in an angle Proc. London Math. Soc. (2)
43 : 1
(1938 ),
pp. 26–32 .
MR
1575417 JFM
63.0278.03 Zbl
0016.26501 article
BibTeX
@article {key1575417m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On functions bounded at the lattice
points in an angle},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {43},
NUMBER = {1},
YEAR = {1938},
PAGES = {26--32},
DOI = {10.1112/plms/s2-43.1.26},
NOTE = {MR:1575417. Zbl:0016.26501. JFM:63.0278.03.},
ISSN = {0024-6115},
}
[34] M. L. Cartwright :
“On the level curves of integral and meromorphic functions Proc. London Math. Soc. (2)
43 : 6
(1938 ),
pp. 468–474 .
MR
1575655 JFM
63.0284.01 Zbl
0017.31501 article
Abstract
BibTeX
Let \( f(z) \) be an integral function; any curve on which \( |f(z)| \) is constant is called a level curve of \( f(z) \) . Some properties of level curves have been discussed by Pennycuick [1936], and in his paper he mentions a conjecture of J. M. Whittaker, viz.:
If the integral functions \( f \) and \( g \) are of constant modulus on a closed curve \( \Gamma \) , then
\[ f(z) = K\{g(z)\}^a \quad (a > 0). \]
Valiron [1937] has shown that this is true except when
\begin{align*}\tag{1} f(z) &=K(w(z)-a)^{\mu}\Bigl(\frac{w(z)-b}{w(z)}\Bigr)^{\nu},\\ g(z) &= K^{\prime}(w(z)-a)^{\mu^{\prime}}\Bigl(\frac{w(z)-b}{w(z)}\Bigr)^{\nu^{\prime}}, \end{align*}
where \( w(z) \) is an integral function without zeros, \( \mu \) , \( \mu^{\prime} \) , \( \nu \) , \( \nu^{\prime} \) are positive integers (including zero), and \( K \) and \( K^{\prime} \) are constants.
I propose to give a different proof which gives a similar, but less striking, theorem for meromorphic functions at the same time. The method is more direct; it shows the significance of the function \( w(z) \) more clearly, and gives certain results about asymptotic values which are not quite obvious from (1).
@article {key1575655m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On the level curves of integral and
meromorphic functions},
JOURNAL = {Proc. London Math. Soc. (2)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Second Series},
VOLUME = {43},
NUMBER = {6},
YEAR = {1938},
PAGES = {468--474},
DOI = {10.1112/plms/s2-43.6.468},
NOTE = {MR:1575655. Zbl:0017.31501. JFM:63.0284.01.},
ISSN = {0024-6115},
}
[35] M. L. Cartwright :
“On level curves of integral functions Quart. J. Math., Oxford Ser.
11 : 1
(1940 ),
pp. 277–290 .
MR
0003219 JFM
66.0351.02 Zbl
0025.16904 article
Abstract
BibTeX
Let \( f(z) \) be an integral or meromorphic function; a curve on which \( |f(z)| \) is constant is called a level curve of \( f(z) \) . Level curves, or branches of level curves, which extend continuously to infinity are sometimes called open level curves and the others closed level curves. Any closed level curve contains at least one simple closed curve as a sub-set; and a simple closed curve on which \( |f(z)| = M \) encloses a simply-connected domain \( D \) in which \( |f(z)| < M \) . Further, \( f(z) \) takes every value \( \alpha \) for which \( |\alpha| < M \) at least once in \( D \) .
The chief object of this paper is to obtain some results for open level curves of integral functions corresponding to those about integral functions which have a common closed level curve.
@article {key0003219m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On level curves of integral functions},
JOURNAL = {Quart. J. Math., Oxford Ser.},
FJOURNAL = {The Quarterly Journal of Mathematics.
Oxford. Second Series},
VOLUME = {11},
NUMBER = {1},
YEAR = {1940},
PAGES = {277--290},
DOI = {10.1093/qmath/os-11.1.277},
NOTE = {MR:0003219. Zbl:0025.16904. JFM:66.0351.02.},
ISSN = {0033-5606},
}
[36] M. L. Cartwright :
“Grace Chisholm Young J. London Math. Soc.
19 : 75 Part 3
(1944 ),
pp. 185–192 .
MR
0013107 Zbl
0060.01816 article
People
BibTeX
@article {key0013107m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Grace {C}hisholm {Y}oung},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {19},
NUMBER = {75 Part 3},
YEAR = {1944},
PAGES = {185--192},
DOI = {10.1112/jlms/19.75_Part_3.185},
NOTE = {MR:0013107. Zbl:0060.01816.},
ISSN = {0024-6107},
}
[37] M. L. Cartwright and J. E. Littlewood :
“On non-linear differential equations of the second order, I J. London Math. Soc.
20 : 3
(1945 ),
pp. 180–189 .
Part II published in Ann. Math. 48 :2 (1947)
MR
0016789 Zbl
0061.18903 article
People
BibTeX
@article {key0016789m,
AUTHOR = {Cartwright, M. L. and Littlewood, J.
E.},
TITLE = {On non-linear differential equations
of the second order, {I}},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {20},
NUMBER = {3},
YEAR = {1945},
PAGES = {180--189},
DOI = {10.1112/jlms/s1-20.3.180},
NOTE = {Part II published in \textit{Ann. Math.}
\textbf{48}:2 (1947). MR:0016789. Zbl:0061.18903.},
ISSN = {0024-6107},
}
[38] M. L. Cartwright and J. E. Littlewood :
“On non-linear differential equations of the second order, II Ann. Math. (2)
48 : 2
(April 1947 ),
pp. 472–494 .
Part I published in J. London Math. Soc. 20 :3 (1945)Ann. Math. 48 :2 (1947)Ann. Math. 50 :2 (1949)
MR
0021190 article
Abstract
People
BibTeX
The present paper is mainly a study of the equation
\[ \ddot y+kf(y) \dot y+g(y,k)=p(t)=p_1(t)+kp_2(t), \]
for \( k > 0 \) and \( f(y)\geqq 1 \) , in real variables in the case when the damping factor \( kf(y) \) is always positive.
@article {key0021190m,
AUTHOR = {Cartwright, M. L. and Littlewood, J.
E.},
TITLE = {On non-linear differential equations
of the second order, {II}},
JOURNAL = {Ann. Math. (2)},
FJOURNAL = {Annals of Mathematics. Second Series},
VOLUME = {48},
NUMBER = {2},
MONTH = {April},
YEAR = {1947},
PAGES = {472--494},
DOI = {10.2307/1969181},
NOTE = {Part I published in \textit{J. London
Math. Soc.} \textbf{20}:3 (1945). Addendum
published in \textit{Ann. Math.} \textbf{48}:2
(1947), errata pubished in \textit{Ann.
Math.} \textbf{50}:2 (1949). MR:0021190.},
ISSN = {0003-486X},
}
[39] M. L. Cartwright :
“Forced oscillations in nearly sinusoidal systems J. Inst. Elec. Engrs. III
95 : 34
(March 1948 ),
pp. 88–96 .
An abstract was published in J. Inst. Elec. Engrs. I 95 :89 (1948)
MR
0027395 article
Abstract
BibTeX
A large class of radio circuits which are analytically equivalent to an oscillatory network in parallel with a non-linear negative resistance, are represented fairly accurately by the differential equation
\[ \ddot{\nu}-(\alpha+\beta\nu-\gamma\nu^2)\dot{\nu}+\omega^2\nu = E\omega_1^2\sin\omega_1 t \]
where \( \alpha/\omega \) , \( \beta/\omega \) and \( \gamma/\omega \) are small. The behaviour of the solutions of this equation near resonance has been discussed by Appleton, van der Pol and others.
The paper contains a more complete discussion of the synchronized and quasi-periodic solutions near resonance, their phases, amplitudes and energy, and also the way in which one type of stable solution gives way to another as the parameters of the system vary, for instance as the electromotive force or detuning vary. It is shown that the phase and amplitude favourable to synchronization are prolonged just before synchronization. This agrees with Appleton’s experimental results. It is also found that hysteresis occurs. The decrease in energy with the decrease in detuning is explained by the fact that the phase favourable to synchronization is that which opposes the motion and is prolonged.
@article {key0027395m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Forced oscillations in nearly sinusoidal
systems},
JOURNAL = {J. Inst. Elec. Engrs. III},
FJOURNAL = {Journal of the Institute of Electrical
Engineers. Part III: Radio and Communication},
VOLUME = {95},
NUMBER = {34},
MONTH = {March},
YEAR = {1948},
PAGES = {88--96},
DOI = {10.1049/ji-3-2.1948.0020},
NOTE = {An abstract was published in \textit{J.
Inst. Elec. Engrs. I} \textbf{95}:89
(1948). MR:0027395.},
}
[40] M. L. Cartwright :
“Topological aspect of forced oscillations ,”
Research
1
(1948 ),
pp. 601–606 .
MR
0026199 article
BibTeX
@article {key0026199m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Topological aspect of forced oscillations},
JOURNAL = {Research},
FJOURNAL = {Research. A Journal of Science and its
Applications},
VOLUME = {1},
YEAR = {1948},
PAGES = {601--606},
NOTE = {MR:0026199.},
}
[41] M. L. Cartwright and J. E. Littlewood :
“Errata: ‘On non-linear differential equations of the second order, II’ Ann. Math. (2)
49 : 4
(October 1948 ),
pp. 1010 .
Errata for article published in Ann. Math. 48 :2 (1947)
MR
0026200 article
People
BibTeX
@article {key0026200m,
AUTHOR = {Cartwright, M. L. and Littlewood, J.
E.},
TITLE = {Errata: ``{O}n non-linear differential
equations of the second order, {II}''},
JOURNAL = {Ann. Math. (2)},
FJOURNAL = {Annals of Mathematics. Second Series},
VOLUME = {49},
NUMBER = {4},
MONTH = {October},
YEAR = {1948},
PAGES = {1010},
DOI = {10.2307/1969411},
NOTE = {Errata for article published in \textit{Ann.
Math.} \textbf{48}:2 (1947). MR:0026200.},
ISSN = {0003-486X},
}
[42] M. L. Cartwright :
“Forced oscillations in nearly sinusoidal systems J. Inst. Elec. Engrs. I
95 : 89
(May 1948 ),
pp. 223 .
Abstract for an article published in J. Inst. Elec. Engrs. III 95 :34 (1948)
article
BibTeX
@article {key17052114,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Forced oscillations in nearly sinusoidal
systems},
JOURNAL = {J. Inst. Elec. Engrs. I},
FJOURNAL = {Journal of the Institute of Electrical
Engineers. Part I: General},
VOLUME = {95},
NUMBER = {89},
MONTH = {May},
YEAR = {1948},
PAGES = {223},
DOI = {10.1049/ji-1.1948.0095},
NOTE = {Abstract for an article published in
\textit{J. Inst. Elec. Engrs. III} \textbf{95}:34
(1948).},
}
[43] M. L. Cartwright, E. T. Copson, and J. Greig :
“Non-linear vibrations ,”
Adv. Sci.
6 : 21
(1949 ),
pp. 64–75 .
MR
0030665 Zbl
0032.21804 article
People
BibTeX
@article {key0030665m,
AUTHOR = {Cartwright, Mary L. and Copson, E. T.
and Greig, J.},
TITLE = {Non-linear vibrations},
JOURNAL = {Adv. Sci.},
FJOURNAL = {Advancement of Science},
VOLUME = {6},
NUMBER = {21},
YEAR = {1949},
PAGES = {64--75},
NOTE = {MR:0030665. Zbl:0032.21804.},
ISSN = {0001-866X},
}
[44] M. L. Cartwright and J. E. Littlewood :
“Addendum to ‘On non-linear differential equations of the second order, II’ Ann. Math. (2)
50 : 2
(April 1949 ),
pp. 504–505 .
Addendum to article published in Ann. Math. 48 :2 (1947)
MR
0030078 Zbl
0038.25001 article
People
BibTeX
@article {key0030078m,
AUTHOR = {Cartwright, M. L. and Littlewood, J.
E.},
TITLE = {Addendum to `{O}n non-linear differential
equations of the second order, {II}'},
JOURNAL = {Ann. Math. (2)},
FJOURNAL = {Annals of Mathematics. Second Series},
VOLUME = {50},
NUMBER = {2},
MONTH = {April},
YEAR = {1949},
PAGES = {504--505},
DOI = {10.2307/1969465},
NOTE = {Addendum to article published in \textit{Ann.
Math.} \textbf{48}:2 (1947). MR:0030078.
Zbl:0038.25001.},
ISSN = {0003-486X},
}
[45] M. L. Cartwright :
“On nonlinear differential equations of the second order, III ,”
Proc. Cambridge Philos. Soc.
45 : 4
(1949 ),
pp. 495–501 .
MR
0032073 Zbl
0038.24905 article
BibTeX
@article {key0032073m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On nonlinear differential equations
of the second order, {III}},
JOURNAL = {Proc. Cambridge Philos. Soc.},
FJOURNAL = {Proceedings of the Cambridge Philosophical
Society},
VOLUME = {45},
NUMBER = {4},
YEAR = {1949},
PAGES = {495--501},
NOTE = {MR:0032073. Zbl:0038.24905.},
ISSN = {0008-1981},
}
[46] M. L. Cartwright :
“Forced oscillations in nonlinear systems ,”
pp. 149–241
in
Contributions to the theory of nonlinear oscillations ,
vol. 1 .
Edited by S. Lefschetz .
Annals of Mathematics Studies 20 .
Princeton University Press ,
1950 .
MR
0035355 Zbl
0039.09901 incollection
Abstract
People
BibTeX
@incollection {key0035355m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Forced oscillations in nonlinear systems},
BOOKTITLE = {Contributions to the theory of nonlinear
oscillations},
EDITOR = {Lefschetz, Solomon},
VOLUME = {1},
SERIES = {Annals of Mathematics Studies},
NUMBER = {20},
PUBLISHER = {Princeton University Press},
YEAR = {1950},
PAGES = {149--241},
NOTE = {MR:0035355. Zbl:0039.09901.},
ISSN = {0066-2313},
ISBN = {9780691079318},
}
[47] M. L. Cartwright :
“Forced oscillations in nonlinear systems ,”
J. Research Nat. Bur. Standards
45
(1950 ),
pp. 514–518 .
MR
0042013 article
BibTeX
@article {key0042013m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Forced oscillations in nonlinear systems},
JOURNAL = {J. Research Nat. Bur. Standards},
FJOURNAL = {Journal of Research of the National
Bureau of Standards},
VOLUME = {45},
YEAR = {1950},
PAGES = {514--518},
NOTE = {MR:0042013.},
ISSN = {0160-1741},
}
[48] M. L. Cartwright and J. E. Littlewood :
“Some fixed point theorems Ann. Math. (2)
54 : 1
(July 1951 ),
pp. 1–37 .
With an appendix by H. D. Ursell.
MR
0042690 Zbl
0058.38604, 0054.07101 article
Abstract
People
BibTeX
We propose to discuss certain fixed point problems in the plane which are connected with the theory of certain differential equations suggested by physical problems mainly equations of the form
\[ \ddot{\xi} + f(\xi)\dot{\xi} + g(\xi) = p(t) ,\]
where \( f \) , \( p \) are continuous, \( g \) satisfies a Lipschitz condition, \( p(t) \) has period 1, and \( g(\xi)/\xi \geq 1 \) for large \( \xi \) at any rate. Our choice of hypotheses and the main lines of our investigations have been dominated by what is significant in the theory of differential equations, but our results are concerned solely with sets of points and transformations of sets of points.
@article {key0042690m,
AUTHOR = {Cartwright, M. L. and Littlewood, J.
E.},
TITLE = {Some fixed point theorems},
JOURNAL = {Ann. Math. (2)},
FJOURNAL = {Annals of Mathematics. Second Series},
VOLUME = {54},
NUMBER = {1},
MONTH = {July},
YEAR = {1951},
PAGES = {1--37},
DOI = {10.2307/1969308},
NOTE = {With an appendix by H.~D. Ursell. MR:0042690.
Zbl:0058.38604, 0054.07101.},
ISSN = {0003-486X},
}
[49] M. L. Cartwright :
“Non-linear vibrations Pi Mu Epsilon J.
1 : 4
(April 1951 ),
pp. 131–137 .
article
BibTeX
@article {key43200630,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Non-linear vibrations},
JOURNAL = {Pi Mu Epsilon J.},
FJOURNAL = {Pi Mu Epsilon Journal},
VOLUME = {1},
NUMBER = {4},
MONTH = {April},
YEAR = {1951},
PAGES = {131--137},
URL = {http://www.pme-math.org/journal/issues/PMEJ.Vol.1.No.4.pdf},
ISSN = {0031-952X},
}
[50] M. L. Cartwright :
“Non-linear vibrations: A chapter in mathematical history Math. Gaz.
36 : 316
(1952 ),
pp. 81–88 .
Presidential address to the Mathematical Association, 3 January 1952.
MR
0046967 Zbl
0049.24607 article
BibTeX
@article {key0046967m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Non-linear vibrations: {A} chapter in
mathematical history},
JOURNAL = {Math. Gaz.},
FJOURNAL = {The Mathematical Gazette},
VOLUME = {36},
NUMBER = {316},
YEAR = {1952},
PAGES = {81--88},
DOI = {10.2307/3610323},
NOTE = {Presidential address to the Mathematical
Association, 3 January 1952. MR:0046967.
Zbl:0049.24607.},
ISSN = {0025-5572},
}
[51] E. F. Collingwood and M. L. Cartwright :
“Boundary theorems for a function meromorphic in the unit circle Acta Math.
87 : 1
(1952 ),
pp. 83–146 .
See also article in Proceedings of the International Congress of Mathematicians (1952)
MR
0050010 Zbl
0046.08402 article
People
BibTeX
@article {key0050010m,
AUTHOR = {Collingwood, E. F. and Cartwright, M.
L.},
TITLE = {Boundary theorems for a function meromorphic
in the unit circle},
JOURNAL = {Acta Math.},
FJOURNAL = {Acta Mathematica},
VOLUME = {87},
NUMBER = {1},
YEAR = {1952},
PAGES = {83--146},
DOI = {10.1007/BF02392284},
NOTE = {See also article in \textit{Proceedings
of the International Congress of Mathematicians}
(1952). MR:0050010. Zbl:0046.08402.},
ISSN = {0001-5962},
}
[52] M. L. Cartwright :
“Van der Pol’s equation for relaxation oscillations ,”
pp. 3–18
in
Contributions to the theory of nonlinear oscillations ,
vol. 2 .
Edited by S. Lefschetz .
Annals of Mathematics Studies 29 .
Princeton University Press ,
1952 .
MR
0052617 Zbl
0048.06902 incollection
Abstract
People
BibTeX
The equation
\[ \ddot{x} - k(1-x^2)\dot{x}+x=0 \]
with \( k \) large and positive has only one periodic solution, other than \( x=0 \) , and this is of a type usually described as a relaxation oscillation (as opposed to a sinusoidal oscillation). It was discussed by van der Pol [1926] who obtained a graphical solution for \( k=10 \) and by le Corbeiller [1936] who, using Liénard’s method, showed that the period
\[ 2T = 2k(3/2 - \log_e 2) + O(k) ,\]
and the greatest height \( h = 2 + O(1) \) as \( k\to\infty \) . Other authors [Flanders and Stoker 1946; Haag 1943, 1944; LaSalle 1949] have also discussed the equation, in particular Dorodnitsin [1947] has obtained an asympotic formula for \( T \) with smaller error terms but his analysis is difficult to follow.
This paper is based on the joint work of Professor J. E. Littlewood and myself, largely on work which was done before that contained in our other published papers on nonlinear differential equations. We shall show that as \( k\to\infty \)
\begin{align*} T &= k(3/2 - \log_e 2) + \frac{3(\alpha+\beta)}{2k^{1/3}} + O\Bigl(\frac{1}{k^{1/3}}\Bigr)\\ h &= 2 + \frac{\alpha+\beta}{3k^{4/3}} + O\Bigl(\frac{1}{k^{4/3}}\Bigr), \end{align*}
where \( \alpha \) and \( \beta \) are constants determined as follows: The equation
\[ \eta_0\frac{d\eta_0}{d\xi} = 2\xi\eta_0 + 1 \]
has one and only one solution \( \eta_0^*(\xi) \) such that \( \eta_0^*(\xi) \to 0 \) as \( \xi\to -\infty \) .
\[ \alpha = \eta_0^*(0),\qquad \beta = \int_0^{\infty}\frac{d\xi}{\eta_0^*(\xi)}. \]
@incollection {key0052617m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Van der {P}ol's equation for relaxation
oscillations},
BOOKTITLE = {Contributions to the theory of nonlinear
oscillations},
EDITOR = {Lefschetz, Solomon},
VOLUME = {2},
SERIES = {Annals of Mathematics Studies},
NUMBER = {29},
PUBLISHER = {Princeton University Press},
YEAR = {1952},
PAGES = {3--18},
NOTE = {MR:0052617. Zbl:0048.06902.},
ISSN = {0066-2313},
ISBN = {9780691095813},
}
[53] J. E. Littlewood and M. L. Cartwright :
“Some topological problems connected with forced oscillations 429–430
in
Proceedings of the International Congress of Mathematicians
(Cambridge, MA, 30 August–6 September 1950 ),
vol. 1 .
American Mathematical Society (Providence, RI ),
1952 .
incollection
People
BibTeX
@incollection {key46850629,
AUTHOR = {Littlewood, J. E. and Cartwright, Mary
L.},
TITLE = {Some topological problems connected
with forced oscillations},
BOOKTITLE = {Proceedings of the {I}nternational {C}ongress
of {M}athematicians},
VOLUME = {1},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1952},
PAGES = {429--430},
URL = {http://www.mathunion.org/ICM/ICM1950.1/ICM1950.1.ocr.pdf},
NOTE = {(Cambridge, MA, 30 August--6 September
1950).},
}
[54] E. F. Collingwood and M. L. Cartwright :
“Boundary theorems for functions meromorphic in the unit circle 390
in
Proceedings of the International Congress of Mathematicians
(Cambridge, MA, 30 August–6 September 1950 ),
vol. 1 .
American Mathematical Society (Providence, RI ),
1952 .
See also article in Acta Math. 87 :1 (1952)
incollection
People
BibTeX
@incollection {key41662120,
AUTHOR = {Collingwood, E. F. and Cartwright, Mary
L.},
TITLE = {Boundary theorems for functions meromorphic
in the unit circle},
BOOKTITLE = {Proceedings of the {I}nternational {C}ongress
of {M}athematicians},
VOLUME = {1},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1952},
PAGES = {390},
URL = {http://www.mathunion.org/ICM/ICM1950.1/ICM1950.1.ocr.pdf},
NOTE = {(Cambridge, MA, 30 August--6 September
1950). See also article in \textit{Acta
Math.} \textbf{87}:1 (1952).},
}
[55] M. L. Cartwright :
Specialization in education .
Headley Brothers (Ashford, UK ),
1954 .
The Winifred Mercier Memorial Lecture delivered at Whitelands College, Putney, 1 October 1954.
booklet
BibTeX
@booklet {key86499181,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Specialization in education},
PUBLISHER = {Headley Brothers},
ADDRESS = {Ashford, UK},
YEAR = {1954},
PAGES = {13},
NOTE = {The Winifred Mercier Memorial Lecture
delivered at Whitelands College, Putney,
1 October 1954.},
}
[56] M. L. Cartwright :
The mathematical mind .
Oxford University Press (London and New York ),
1955 .
The James Bryce memorial lecture.
See also article in Math. Spectrum 2 :2 (1969–70)
MR
0073503 Zbl
0064.24103 booklet
BibTeX
@booklet {key0073503m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The mathematical mind},
PUBLISHER = {Oxford University Press},
ADDRESS = {London and New York},
YEAR = {1955},
PAGES = {28},
NOTE = {The James Bryce memorial lecture. See
also article in \textit{Math. Spectrum}
\textbf{2}:2 (1969--70). MR:0073503.
Zbl:0064.24103.},
}
[57] M. L. Cartwright :
“On the stability of solutions of certain differential equations of the fourth order Quart. J. Mech. Appl. Math.
9 : 2
(1956 ),
pp. 185–194 .
MR
0080221 Zbl
0071.30901 article
Abstract
BibTeX
The Routh–Hurwitz criteria for the stability of solutions of linear differential equations of the fourth order are generalized for certain types of non-linear differential equations of the fourth order by the use of Lyapunov’s function \( V \) . The method is similar to that of Barbasin and Simanov for third order equations, but yields somewhat less satisfactory results.
@article {key0080221m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On the stability of solutions of certain
differential equations of the fourth
order},
JOURNAL = {Quart. J. Mech. Appl. Math.},
FJOURNAL = {The Quarterly Journal of Mechanics and
Applied Mathematics},
VOLUME = {9},
NUMBER = {2},
YEAR = {1956},
PAGES = {185--194},
DOI = {10.1093/qjmam/9.2.185},
NOTE = {MR:0080221. Zbl:0071.30901.},
ISSN = {0033-5614},
}
[58] M. L. Cartwright :
“Some aspects of the theory of non-linear vibrations 71–76
in
Proceedings of the International Congress of Mathematicians, 1954
(Amsterdam, 2–9 September 1954 ),
vol. 3 .
Erven P. Noordhoff (Groningen ),
1956 .
MR
0084670 Zbl
0073.11403 incollection
BibTeX
@incollection {key0084670m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Some aspects of the theory of non-linear
vibrations},
BOOKTITLE = {Proceedings of the {I}nternational {C}ongress
of {M}athematicians, 1954},
VOLUME = {3},
PUBLISHER = {Erven P. Noordhoff},
ADDRESS = {Groningen},
YEAR = {1956},
PAGES = {71--76},
URL = {http://www.mathunion.org/ICM/ICM1954.3/Main/icm1954.3.0071.0076.ocr.pdf},
NOTE = {(Amsterdam, 2--9 September 1954). MR:0084670.
Zbl:0073.11403.},
}
[59] M. L. Cartwright :
Integral functions .
Cambridge tracts in mathematics and mathematical physics 44 .
Cambridge University Press ,
1956 .
MR
0077622 Zbl
0075.05901 book
BibTeX
@book {key0077622m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Integral functions},
SERIES = {Cambridge tracts in mathematics and
mathematical physics},
NUMBER = {44},
PUBLISHER = {Cambridge University Press},
YEAR = {1956},
PAGES = {viii+135},
NOTE = {MR:0077622. Zbl:0075.05901.},
ISSN = {0068-6824},
}
[60] M. L. Cartwright :
“On the decomposition of functions regular in a circle J. London Math. Soc.
34 : 4
(1959 ),
pp. 454–456 .
MR
0150311 Zbl
0092.07003 article
Abstract
BibTeX
Suppose that \( f(z) \) is regular for \( |z| < 1 \) . Then
\begin{equation*}\tag{1} f(z) = \frac{1}{2\pi i}\int_C \frac{f(\zeta)}{\zeta - z}d\zeta, \end{equation*}
where \( C \) is a simple closed contour in \( |\zeta| < 1 \) containing the point \( z \) in its interior domain. If \( z \) lies outside \( C \) , the integral in (1) is zero. Now suppose that \( C = C_1\cup C_2 \) , where \( C_1 \) is a simple arc from \( a \) to \( b \) , and \( C_2 \) a simple arc from \( b \) to \( a \) . Then
\[ f(z) = \frac{1}{2\pi i}\Bigl\{\int_{C_1} {+} \int_{C_2}\Bigr\}\frac{f(\zeta)}{\zeta - z}d\zeta = f_1(z)+f_2(z) .\]
Since \( f(\zeta) \) is regular on \( C \) and \( 1/(\zeta-z) \) is a regular function of \( z \) and \( \zeta \) except for \( \zeta = z \) , \( f_1(z) \) and \( f_2(z) \) are regular in the plane cut along \( C_1 \) and \( C_2 \) respectively. Nevertheless their sum is \( f(z) \) , which may have singularities on and outside \( |z| = 1 \) and certainly has none on \( C_1 \) or \( C_2 \) . The object of this paper is to investigate the nature of the functions \( f_1(z) \) , \( f_2(z) \) obtained in this way.
@article {key0150311m,
AUTHOR = {Cartwright, M. L.},
TITLE = {On the decomposition of functions regular
in a circle},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {34},
NUMBER = {4},
YEAR = {1959},
PAGES = {454--456},
DOI = {10.1112/jlms/s1-34.4.454},
NOTE = {MR:0150311. Zbl:0092.07003.},
ISSN = {0024-6107},
}
[61] M. L. Cartwright :
“Some decomposition theorems for certain invariant continua and their minimal sets Fund. Math.
48 : 3
(1959/1960 ),
pp. 229–250 .
MR
0126259 Zbl
0095.37502 article
BibTeX
@article {key0126259m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Some decomposition theorems for certain
invariant continua and their minimal
sets},
JOURNAL = {Fund. Math.},
FJOURNAL = {Fundamenta Mathematicae. Polska Akademia
Nauk},
VOLUME = {48},
NUMBER = {3},
YEAR = {1959/1960},
PAGES = {229--250},
URL = {http://matwbn.icm.edu.pl/ksiazki/fm/fm48/fm48120.pdf},
NOTE = {MR:0126259. Zbl:0095.37502.},
ISSN = {0016-2736},
}
[62] M. L. Cartwright :
“The application of Lyapunov’s second method to certain differential equations of the third order ,”
Rend. Sem. Mat. Univ. Politec. Torino
19
(1959/1960 ),
pp. 37–40 .
MR
0124583 Zbl
0096.29702 article
BibTeX
@article {key0124583m,
AUTHOR = {Cartwright, M. L.},
TITLE = {The application of {L}yapunov's second
method to certain differential equations
of the third order},
JOURNAL = {Rend. Sem. Mat. Univ. Politec. Torino},
FJOURNAL = {Rendiconti del Seminario Matematico.
Universit\`a e Politecnico, Torino},
VOLUME = {19},
YEAR = {1959/1960},
PAGES = {37--40},
NOTE = {MR:0124583. Zbl:0096.29702.},
ISSN = {0373-1243},
}
[63] M. L. Cartwright :
“Balthazar van der Pol J. London Math. Soc.
35 : 3
(1960 ),
pp. 367–376 .
MR
0123447 Zbl
0094.00513 article
Abstract
People
BibTeX
Balthazar van der Pol died on October 6, 1959, at Wassenaar, Holland. He was a pioneer in the field of radio, and a well-known personality in the field of international telecommunications, but he also pursued the mathematical problems encountered in radio work so far that his work has formed the basis of much of the modern theory of non-linear oscillations, and he has given his name to the most typical equation of that theory.
@article {key0123447m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Balthazar van der {P}ol},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {35},
NUMBER = {3},
YEAR = {1960},
PAGES = {367--376},
DOI = {10.1112/jlms/s1-35.3.367},
NOTE = {MR:0123447. Zbl:0094.00513.},
ISSN = {0024-6107},
}
[64] M. L. Cartwright :
“Reduction of systems of linear differential equations to Jordan normal form Ann. Mat. Pura Appl. (4)
51 : 1
(1960 ),
pp. 147–160 .
MR
0120416 Zbl
0166.03703 article
Abstract
BibTeX
Various methods are discussed of finding a non-singular matrix \( P \) such that \( PAP^{-1}=J \) , where \( J \) is the Jordan normal form of \( A \) , with special reference to the problem of reducing the system of equations \( x=Ax \) to the form \( y=Jy \) , where \( y=Px \) .
@article {key0120416m,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Reduction of systems of linear differential
equations to {J}ordan normal form},
JOURNAL = {Ann. Mat. Pura Appl. (4)},
FJOURNAL = {Annali di Matematica Pura ed Applicata.
Serie Quarta},
VOLUME = {51},
NUMBER = {1},
YEAR = {1960},
PAGES = {147--160},
DOI = {10.1007/BF02410949},
NOTE = {MR:0120416. Zbl:0166.03703.},
ISSN = {0003-4622},
}
[65] M. L. Cartwright :
“Sheila Scott Macintyre J. London Math. Soc.
36 : 1
(1961 ),
pp. 254–256 .
MR
0123449 Zbl
0095.00501 article
People
BibTeX
@article {key0123449m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Sheila {S}cott {M}acintyre},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {36},
NUMBER = {1},
YEAR = {1961},
PAGES = {254--256},
DOI = {10.1112/jlms/s1-36.1.254},
NOTE = {MR:0123449. Zbl:0095.00501.},
ISSN = {0024-6107},
}
[66] M. L. Cartwright :
“Almost periodic solutions of certain second order differential equations 100–110
in
Seminario matematico e fisico di Milano
[Milan mathematics and physics seminar ]
(Milan, 29–30 March 1960 ),
published as Rend. Sem. Mat. Fis. Milano
31 : 1
(1961 ).
MR
0155047 Zbl
0102.30901 incollection
Abstract
BibTeX
@article {key0155047m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic solutions of certain
second order differential equations},
JOURNAL = {Rend. Sem. Mat. Fis. Milano},
FJOURNAL = {Rendiconti del Seminario Matematico
e Fisico di Milano},
VOLUME = {31},
NUMBER = {1},
YEAR = {1961},
PAGES = {100--110},
DOI = {10.1007/BF02923201},
NOTE = {\textit{Seminario matematico e fisico
di {M}ilano} (Milan, 29--30 March 1960).
MR:0155047. Zbl:0102.30901.},
ISSN = {1424-9286},
}
[67] M. L. Cartwright :
“The stability of dynamical systems ”
in
Atti del 6o Congresso dell’Unione Matematica Italiana
[Proceedings of the 6th Congress of the Union of Italian Mathematicians ]
(Naples, 11–16 September 1959 ).
Cremonese (Rome ),
1961 .
incollection
BibTeX
@incollection {key97374810,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The stability of dynamical systems},
BOOKTITLE = {Atti del 6o {C}ongresso dell'{U}nione
{M}atematica {I}taliana [Proceedings
of the 6th {C}ongress of the {U}nion
of {I}talian {M}athematicians]},
PUBLISHER = {Cremonese},
ADDRESS = {Rome},
YEAR = {1961},
NOTE = {(Naples, 11--16 September 1959).},
ISBN = {9788870835373},
}
[68] M. L. Cartwright and E. F. Collingwood :
“The radial limits of functions meromorphic in a circular disc Math. Z.
76 : 1
(1961 ),
pp. 404–410 .
MR
0130379 Zbl
0156.08302 article
People
BibTeX
@article {key0130379m,
AUTHOR = {Cartwright, M. L. and Collingwood, E.
F.},
TITLE = {The radial limits of functions meromorphic
in a circular disc},
JOURNAL = {Math. Z.},
FJOURNAL = {Mathematische Zeitschrift},
VOLUME = {76},
NUMBER = {1},
YEAR = {1961},
PAGES = {404--410},
DOI = {10.1007/BF01210986},
NOTE = {MR:0130379. Zbl:0156.08302.},
ISSN = {0025-5874},
}
[69] M. L. Cartwright :
“A generalization of Montel’s theorem J. London Math. Soc.
37 : 1
(1962 ),
pp. 179–184 .
MR
0140692 Zbl
0137.05002 article
Abstract
BibTeX
Let \( S \) denote the half strip, \( \alpha < x < \beta \) and \( y > 1 \) , of the \( z = x + iy \) plane, and suppose that \( f(z) \) is regular and \( |f(z)| < M \) in \( S \) unless otherwise stated. Montel’s theorem for a half strip states that, if \( f(a+iy)\to l \) as \( y\to\infty \) for any fixed \( a \) such that \( a < \alpha < \beta \) , then, for every \( \delta > 0 \) , \( f(x+iy)\to l \) as \( y\to\infty \) uniformly for \( \alpha + \delta \leq x \leq \beta - \delta \) . The result is false if \( f(z) \) is replaced by its modulus in both hypothesis and conclusion, but Hardy and Carleman [1922], and later Hardy, Ingham and Pólya [1928] obtained some results for the case in which \( |f(x+iy)| \) tends to a limit along two lines in \( S \) . The object of this note is to show how the results of Hardy, Ingham and Pólya can be improved when \( |f| \) tends to a limit which is not very much less than \( M \) .
@article {key0140692m,
AUTHOR = {Cartwright, M. L.},
TITLE = {A generalization of {M}ontel's theorem},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {37},
NUMBER = {1},
YEAR = {1962},
PAGES = {179--184},
DOI = {10.1112/jlms/s1-37.1.179},
NOTE = {MR:0140692. Zbl:0137.05002.},
ISSN = {0024-6107},
}
[70] M. L. Cartwright :
“Almost periodic solutions of systems of two periodic equations ,”
pp. 256–263
in
Analytic methods in the theory of non-linear vibrations ,
vol. I .
Izdat. Akad. Nauk Ukrain. SSR (Kiev ),
1963 .
MR
0157366 Zbl
0122.32803 incollection
BibTeX
@incollection {key0157366m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic solutions of systems
of two periodic equations},
BOOKTITLE = {Analytic methods in the theory of non-linear
vibrations},
VOLUME = {I},
PUBLISHER = {Izdat. Akad. Nauk Ukrain. SSR},
ADDRESS = {Kiev},
YEAR = {1963},
PAGES = {256--263},
NOTE = {MR:0157366. Zbl:0122.32803.},
}
[71] M. L. Cartwright :
“Almost periodic solutions of equations with periodic coefficients ,”
pp. 207–218
in
Nonlinear problems
(Madison, WI, 30 April–2 May 1962 ).
Edited by R. E. Langer .
University of Wisconsin (Madison, WI ),
1963 .
MR
0186871 Zbl
0111.28602 incollection
People
BibTeX
@incollection {key0186871m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic solutions of equations
with periodic coefficients},
BOOKTITLE = {Nonlinear problems},
EDITOR = {Langer, Rudolph Ernest},
PUBLISHER = {University of Wisconsin},
ADDRESS = {Madison, WI},
YEAR = {1963},
PAGES = {207--218},
NOTE = {(Madison, WI, 30 April--2 May 1962).
MR:0186871. Zbl:0111.28602.},
}
[72] M. L. Cartwright :
“Edward Charles Titchmarsh J. London Math. Soc.
39 : 1
(1964 ),
pp. 544–565 .
Also published in Biograph. Mem. of Fell. of the Roy. Soc. 10 (1964)Oxford dictionary of national biography 61 (2004)
MR
0175740 Zbl
0124.24509 article
People
BibTeX
@article {key0175740m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Edward {C}harles {T}itchmarsh},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {39},
NUMBER = {1},
YEAR = {1964},
PAGES = {544--565},
DOI = {10.1112/jlms/s1-39.1.544},
NOTE = {Also published in \textit{Biograph.
Mem. of Fell. of the Roy. Soc.} \textbf{10}
(1964) and (in abbreviated form) in
\textit{Oxford dictionary of national
biography} \textbf{61} (2004). MR:0175740.
Zbl:0124.24509.},
ISSN = {0024-6107},
}
[73] M. L. Cartwright :
“The zeros of a certain entire function J. Math. Anal. Appl.
9 : 3
(1964 ),
pp. 341–347 .
MR
0171014 Zbl
0145.08201 article
BibTeX
@article {key0171014m,
AUTHOR = {Cartwright, M. L.},
TITLE = {The zeros of a certain entire function},
JOURNAL = {J. Math. Anal. Appl.},
FJOURNAL = {Journal of Mathematical Analysis and
Applications},
VOLUME = {9},
NUMBER = {3},
YEAR = {1964},
PAGES = {341--347},
DOI = {10.1016/0022-247X(64)90020-4},
NOTE = {MR:0171014. Zbl:0145.08201.},
ISSN = {0022-247x},
}
[74] M. L. Cartwright :
“From non-linear oscillations to topological dynamics J. London Math. Soc.
39 : 1
(1964 ),
pp. 193–201 .
MR
0160988 Zbl
0119.07402 article
BibTeX
@article {key0160988m,
AUTHOR = {Cartwright, M. L.},
TITLE = {From non-linear oscillations to topological
dynamics},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {39},
NUMBER = {1},
YEAR = {1964},
PAGES = {193--201},
DOI = {10.1112/jlms/s1-39.1.193},
NOTE = {MR:0160988. Zbl:0119.07402.},
ISSN = {0024-6107},
}
[75] M. L. Cartwright :
“Edward Charles Titchmarsh Biograph. Mem. of Fell. of the Roy. Soc.
10
(November 1964 ),
pp. 305–324 .
Also published in J. London Math. Soc. 39 :1 (1964)Oxford dictionary of national biography 61 (2004)
article
People
BibTeX
@article {key14616674,
AUTHOR = {Cartwright, M. L.},
TITLE = {Edward {C}harles {T}itchmarsh},
JOURNAL = {Biograph. Mem. of Fell. of the Roy.
Soc.},
FJOURNAL = {Biographical Memoirs of Fellows of the
Royal Society},
VOLUME = {10},
MONTH = {November},
YEAR = {1964},
PAGES = {305--324},
DOI = {10.1098/rsbm.1964.0018},
NOTE = {Also published in \textit{J. London
Math. Soc.} \textbf{39}:1 (1964) and
(in abbreviated form) in \textit{Oxford
dictionary of national biography} \textbf{61}
(2004).},
ISSN = {0080-4606},
}
[76] M. L. Cartwright :
“Equicontinuous mappings of plane minimal sets Proc. London Math. Soc. (3)
14A : 1
(1965 ),
pp. 51–54 .
Dedicated to J. E. Littlewood on his 80th birthday.
MR
0177395 Zbl
0129.38705 article
Abstract
People
BibTeX
Let \( f \) be a homeomorphism of the plane which maps a compact plane set \( M \) on to itself in such a way that the iterates \( f^n \) , \( n = 0 \) , \( \pm 1 \) , \( \pm 2,\dots \) , form an equicontinuous family on \( M \) . Suppose further that \( M \) is a minimal set, that is to say, closed and invariant and irreducible with respect to these properties. Then \( M \) is the orbit-closure of every point \( p \) of \( M \) . It is well known that if \( M \) is zero-dimensional then \( f \) is isochronous (regularly almost periodic). Further, Hemmingsen [1954] has shown that if \( M \) is connected then \( M \) is a simple closed curve and \( f \) is an irrational rotation. It follows that if \( M \) has \( n \) components then each component is a simple closed curve and \( f^n \) is an irrational rotation on each. The object of this note is to show that these are the only possible types of minimal set in the plane on which the mapping has equicontinuous iterates. That is to say there are no minimal sets with an infinity of components other than zero-dimensional sets for which the mapping has equicontinuous iterates .
@article {key0177395m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Equicontinuous mappings of plane minimal
sets},
JOURNAL = {Proc. London Math. Soc. (3)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Third Series},
VOLUME = {14A},
NUMBER = {1},
YEAR = {1965},
PAGES = {51--54},
DOI = {10.1112/plms/s3-14A.1.51},
NOTE = {Dedicated to J.~E. Littlewood on his
80th birthday. MR:0177395. Zbl:0129.38705.},
ISSN = {0024-6115},
}
[77] M. L. Cartwright :
“Topological problems of nonlinear mechanics ,”
pp. 135–142
in
3rd conference on nonlinear oscillations
(Berlin, 25–30 May 1964 ),
published as Abh. Deutsch. Akad. Wiss. Berlin Kl. Math. Phys. Tech.
1 : 1–2 .
Issue edited by K. Schröder, R. Reissig, and G. Maess .
1965 .
MR
0194659 Zbl
0199.14402 incollection
People
BibTeX
@article {key0194659m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Topological problems of nonlinear mechanics},
JOURNAL = {Abh. Deutsch. Akad. Wiss. Berlin Kl.
Math. Phys. Tech.},
FJOURNAL = {Abhandlungen der Deutschen Akademie
der Wissenschaften zu Berlin. Klasse
f\"ur Mathematik, Physik und Technik},
VOLUME = {1},
NUMBER = {1--2},
YEAR = {1965},
PAGES = {135--142},
NOTE = {\textit{3rd conference on nonlinear
oscillations} (Berlin, 25--30 May 1964).
Issue edited by K. Schr\"oder,
R. Reissig, and G. Maess.
MR:0194659. Zbl:0199.14402.},
ISSN = {0065-5112},
}
[78] M. L. Cartwright :
“Jacques Hadamard J. London Math. Soc.
40 : 1
(1965 ),
pp. 722–748 .
MR
0181556 Zbl
0127.24403 article
People
BibTeX
@article {key0181556m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Jacques {H}adamard},
JOURNAL = {J. London Math. Soc.},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {40},
NUMBER = {1},
YEAR = {1965},
PAGES = {722--748},
DOI = {10.1112/jlms/s1-40.1.722},
NOTE = {MR:0181556. Zbl:0127.24403.},
ISSN = {0024-6107},
}
[79] M. L. Cartwright :
“Almost periodic flows and solutions of differential equations Math. Nachr.
32 : 5
(1966 ),
pp. 257–261 .
Lecture given at the celebrations of the 150th anniversary of Weierstrass’ birthday, 19–23 October 1963.
An expanded version of this article was published in Proc. London Math. Soc. 17 :2 (1967)
MR
0224932 Zbl
0264.34057 article
BibTeX
@article {key0224932m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic flows and solutions
of differential equations},
JOURNAL = {Math. Nachr.},
FJOURNAL = {Mathematische Nachrichten},
VOLUME = {32},
NUMBER = {5},
YEAR = {1966},
PAGES = {257--261},
DOI = {10.1002/mana.19660320503},
NOTE = {Lecture given at the celebrations of
the 150th anniversary of Weierstrass'
birthday, 19--23 October 1963. An expanded
version of this article was published
in \textit{Proc. London Math. Soc.}
\textbf{17}:2 (1967). MR:0224932. Zbl:0264.34057.},
ISSN = {0025-584X},
}
[80] M. L. Cartwright :
“Almost periodic flows and solutions of differential equations Proc. London Math. Soc. (3)
17 : 2
(1967 ),
pp. 355–380 .
Corrigenda published in Proc. London Math. Soc. 17 :4 (1967)Math. Nachr. 32 :5 (1966)
MR
1576613 Zbl
0155.41901 article
BibTeX
@article {key1576613m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic flows and solutions
of differential equations},
JOURNAL = {Proc. London Math. Soc. (3)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Third Series},
VOLUME = {17},
NUMBER = {2},
YEAR = {1967},
PAGES = {355--380},
DOI = {10.1112/plms/s3-17.2.355},
NOTE = {Corrigenda published in \textit{Proc.
London Math. Soc.} \textbf{17}:4 (1967).
Expanded version of article published
in \textit{Math. Nachr.} \textbf{32}:5
(1966). MR:1576613. Zbl:0155.41901.},
ISSN = {0024-6115},
CODEN = {PLMTAL},
}
[81] M. L. Cartwright :
“Corrigenda: ‘Almost periodic flows and solutions of differential equations’ Proc. London Math. Soc. (3)
17 : 4
(1967 ),
pp. 768 .
Corrigenda for article published in Proc. London Math. Soc. 17 :2 (1967)
MR
1577210 article
BibTeX
@article {key1577210m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Corrigenda: ``{A}lmost periodic flows
and solutions of differential equations''},
JOURNAL = {Proc. London Math. Soc. (3)},
FJOURNAL = {Proceedings of the London Mathematical
Society. Third Series},
VOLUME = {17},
NUMBER = {4},
YEAR = {1967},
PAGES = {768},
DOI = {10.1112/plms/s3-17.4.768-s},
NOTE = {Corrigenda for article published in
\textit{Proc. London Math. Soc.} \textbf{17}:2
(1967). MR:1577210.},
ISSN = {0024-6115},
CODEN = {PLMTAL},
}
[82] M. L. Cartwright :
“Almost periodic differential equations and almost periodic flows J. Differ. Equations
5 : 1
(1969 ),
pp. 167–181 .
MR
0239191 Zbl
0167.07804 article
Abstract
BibTeX
In a earlier paper [1967] I discussed the basic frequencies of uniformly almost periodic (u.a.p.) solutions of the systems
\begin{align*} \mathbf{\dot{x}} &= \mathbf{\psi}(\mathbf{x}), & \mathbf{\dot{x}} &= \frac{d\mathbf{x}}{dt},\\ \mathbf{\dot{x}} &= \mathbf{\psi}(\mathbf{x},t), & \mathbf{\psi}(\mathbf{x},t) &= \mathbf{\psi}(\mathbf{x},t+2\pi), \end{align*}
where \( \mathbf{x} \) and \( \mathbf{\psi} \) are vectors in \( R^n \) , real Euclidean space of \( n \) dimensions. The object of this paper is to extend those results to the system
\[\mathbf{\dot{x}} = \mathbf{\psi}(\mathbf{x},t), \qquad\mathbf{\psi}(\mathbf{x},t)\text{ u.a.p. in } t, \]
where the almost periodicity is uniform with respect to \( \mathbf{x} \) for \( \mathbf{x} \) bounded.
@article {key0239191m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic differential equations
and almost periodic flows},
JOURNAL = {J. Differ. Equations},
FJOURNAL = {Journal of Differential Equations},
VOLUME = {5},
NUMBER = {1},
YEAR = {1969},
PAGES = {167--181},
DOI = {10.1016/0022-0396(69)90110-7},
NOTE = {MR:0239191. Zbl:0167.07804.},
ISSN = {0022-0396},
}
[83] M. L. Cartwright :
“Limits of harmonic functions in a half-strip Bull. London Math. Soc.
1 : 1
(1969 ),
pp. 40–42 .
MR
0240322 Zbl
0176.41103 article
Abstract
BibTeX
Let \( S = \{z = x + iy;\ -1 < x < 1,\ y > 0\} \) , and suppose that \( u(x,y) \) is harmonic and bounded in the half-strip \( S \) . It is well known that if
\begin{equation*}\tag{1} u(\alpha_s,y)\to a_s \end{equation*}
as \( y\to\infty \) , for \( s=1,2 \) and \( -1 < \alpha_1 < \alpha_2 < 1 \) , then, for every \( \delta > 0 \) ,
\begin{equation*}\tag{2} u(x,y)\to a_1\frac{\alpha_2-x}{\alpha_2-\alpha_1} + a_2\frac{x-\alpha_2}{\alpha_2-\alpha_1} \end{equation*}
as \( y\to\infty \) , uniformly for \( -1+\delta \leq x \leq 1-\delta \) . The object of this paper is to establish a result corresponding to (2) when \( u(x,y) \) tends to a limit as \( y\to\infty \) along two fairly general curves in \( S \) .
@article {key0240322m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Limits of harmonic functions in a half-strip},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {1},
NUMBER = {1},
YEAR = {1969},
PAGES = {40--42},
DOI = {10.1112/blms/1.1.40},
NOTE = {MR:0240322. Zbl:0176.41103.},
ISSN = {0024-6093},
}
[84] M. L. Cartwright :
“Comparison theorems for almost periodic functions J. London Math. Soc. (2)
1 : 1
(1969 ),
pp. 11–19 .
MR
0288512 Zbl
0194.11504 article
Abstract
BibTeX
In the course of trying to prove certain results about the uniformly almost periodic (u.a.p.) solutions of systems of ordinary differential equations involving u.a.p. vector functions I found it necessary to establish certain general relationships between the translation numbers and the exponents of two u.a.p. vector functions. Some of the results are obvious consequences of well-known theorems, but some seem to be of intrinsic interest, and it seemed worth while to make as complete a review of such relationships as possible.
@article {key0288512m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Comparison theorems for almost periodic
functions},
JOURNAL = {J. London Math. Soc. (2)},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {1},
NUMBER = {1},
YEAR = {1969},
PAGES = {11--19},
DOI = {10.1112/jlms/s2-1.1.11},
NOTE = {MR:0288512. Zbl:0194.11504.},
ISSN = {0024-6107},
}
[85] M. L. Cartwright :
“The mathematical mind Math. Spectrum
2 : 2
(1969–70 ),
pp. 37–44 .
The material in this article formed the substance of the author’s James Bryce Memorial Lecture (1955) .
article
BibTeX
@article {key78276834,
AUTHOR = {Cartwright, Mary L.},
TITLE = {The mathematical mind},
JOURNAL = {Math. Spectrum},
FJOURNAL = {Mathematical Spectrum},
VOLUME = {2},
NUMBER = {2},
YEAR = {1969--70},
PAGES = {37--44},
URL = {http://ms.appliedprobability.org/data/files/Abstracts%202/2-2-1.pdf},
NOTE = {The material in this article formed
the substance of the author's James
Bryce Memorial Lecture (1955).},
ISSN = {0025-5653},
}
[86] M. L. Cartwright :
“Almost periodic solutions of differential equations and their basic frequencies ,”
pp. 205–207
in
Proceedings of the fifth international conference on non-linear oscillations
(Kiev, 25 August–4 September 1969 ),
Section 2: Qualitative methods in the theory of nonlinear oscillations .
Edited by Y. Mitropol’skii .
Izdat. Akad. Nauk Ukrain. S.S.R. (Kiev ),
1970 .
Zbl
0229.34042 incollection
People
BibTeX
Yurii Alekseevich Mitropolskii
Related
@incollection {key0229.34042z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Almost periodic solutions of differential
equations and their basic frequencies},
BOOKTITLE = {Proceedings of the fifth international
conference on non-linear oscillations},
EDITOR = {Mitropol'skii, Yuri},
VOLUME = {2: Qualitative methods in the theory
of nonlinear oscillations},
PUBLISHER = {Izdat. Akad. Nauk Ukrain. S.S.R.},
ADDRESS = {Kiev},
YEAR = {1970},
PAGES = {205--207},
NOTE = {(Kiev, 25 August--4 September 1969).
Zbl:0229.34042.},
}
[87] M. L. Cartwright :
“Mathematics and thinking mathematically Amer. Math. Mon.
77 : 1
(January 1970 ),
pp. 20–28 .
MR
0255336 article
BibTeX
@article {key0255336m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Mathematics and thinking mathematically},
JOURNAL = {Amer. Math. Mon.},
FJOURNAL = {The American Mathematical Monthly},
VOLUME = {77},
NUMBER = {1},
MONTH = {January},
YEAR = {1970},
PAGES = {20--28},
DOI = {10.2307/2316849},
NOTE = {MR:0255336.},
ISSN = {0002-9890},
}
[88] M. L. Cartwright :
“Almost periodic solutions of differential equations and flows 35–43
in
Global differentiable dynamics
(Case Western Reserve University, Cleveland, OH, 2–6 June 1969 ).
Edited by O. Hajek, A. J. Lohwater, and R. McCann .
Lecture Notes in Mathematics 235 .
Springer (Berlin ),
1971 .
MR
0492589 Zbl
0238.34078 incollection
People
BibTeX
@incollection {key0492589m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Almost periodic solutions of differential
equations and flows},
BOOKTITLE = {Global differentiable dynamics},
EDITOR = {Hajek, O. and Lohwater, A. J. and McCann,
R.},
SERIES = {Lecture Notes in Mathematics},
NUMBER = {235},
PUBLISHER = {Springer},
ADDRESS = {Berlin},
YEAR = {1971},
PAGES = {35--43},
DOI = {10.1007/BFb0059192},
NOTE = {(Case Western Reserve University, Cleveland,
OH, 2--6 June 1969). MR:0492589. Zbl:0238.34078.},
ISSN = {0075-8434},
ISBN = {9783540056744},
}
[89] M. L. Cartwright and W. K. Hayman :
“Edward Foyle Collingwood Biogr. Mem. Fellows. R. Soc.
17
(November 1971 ),
pp. 139–158 .
article
People
BibTeX
@article {key63550131,
AUTHOR = {Cartwright, Mary L. and Hayman, W. K.},
TITLE = {Edward {F}oyle {C}ollingwood},
JOURNAL = {Biogr. Mem. Fellows. R. Soc.},
FJOURNAL = {Biographical Memoirs of Fellows of the
Royal Society},
VOLUME = {17},
MONTH = {November},
YEAR = {1971},
PAGES = {139--158},
DOI = {10.1098/rsbm.1971.0005},
ISSN = {0080-4606},
}
[90] M. L. Cartwright :
“Almost periodic minimal sets 139–142
in
Proceedings of symposium on differential equations and dynamical systems
(University of Warwick, UK, September 1968–August 1969 ).
Edited by D. Chillingworth .
Lecture Notes in Mathematics 206 .
Springer (Berlin ),
1971 .
incollection
People
BibTeX
David Robert John Chillingworth
Related
@incollection {key34087032,
AUTHOR = {Cartwright, Mary L.},
TITLE = {Almost periodic minimal sets},
BOOKTITLE = {Proceedings of symposium on differential
equations and dynamical systems},
EDITOR = {Chillingworth, David},
SERIES = {Lecture Notes in Mathematics},
NUMBER = {206},
PUBLISHER = {Springer},
ADDRESS = {Berlin},
YEAR = {1971},
PAGES = {139--142},
DOI = {10.1007/BFb0070193},
NOTE = {(University of Warwick, UK, September
1968--August 1969).},
ISSN = {0075-8434},
ISBN = {9783540054955},
}
[91] M. L. Cartwright :
“Conditions for boundedness of systems of ordinary differential equations ,”
pp. 19–26
in
Ordinary differential equations
(Mathematics Research Center, Naval Research Laboratory, Washington, DC, 14–23 June 1971 ).
Edited by L. Weiss .
Academic Press (New York ),
1972 .
MR
0432972 Zbl
0309.34020 incollection
People
BibTeX
@incollection {key0432972m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Conditions for boundedness of systems
of ordinary differential equations},
BOOKTITLE = {Ordinary differential equations},
EDITOR = {Weiss, Leonard},
PUBLISHER = {Academic Press},
ADDRESS = {New York},
YEAR = {1972},
PAGES = {19--26},
NOTE = {(Mathematics Research Center, Naval
Research Laboratory, Washington, DC,
14--23 June 1971). MR:0432972. Zbl:0309.34020.},
ISBN = {9780127436500},
}
[92] G. H. Hardy :
Collected papers of G. H. Hardy ,
vol. 5 .
Edited by I. W. Busbridge, M. L. Cartwright, E. F. Collingwood, H. Davenport, T. M. Flett, H. Heilbronn, A. E. Ingham, R. Rado, R. A. Rankin, W. W. Rogosinski, F. Smithies, E. C. Titchmarsh, and E. M. Wright .
Clarendon Press (Oxford ),
1972 .
MR
0497843 Zbl
0251.01013 book
People
BibTeX
@book {key0497843m,
AUTHOR = {Hardy, G. H.},
TITLE = {Collected papers of {G}.~{H}. {H}ardy},
VOLUME = {5},
PUBLISHER = {Clarendon Press},
ADDRESS = {Oxford},
YEAR = {1972},
PAGES = {xv+694},
NOTE = {Edited by I. W. Busbridge,
M. L. Cartwright, E. F. Collingwood,
H. Davenport, T. M. Flett,
H. Heilbronn, A. E. Ingham,
R. Rado, R. A. Rankin,
W. W. Rogosinski,
F. Smithies, E. C. Titchmarsh,
and E. M. Wright. MR:0497843.
Zbl:0251.01013.},
ISBN = {9780198533351},
}
[93] G. H. Hardy :
Collected papers of G. H. Hardy ,
vol. 6 .
Edited by L. S. Bosanquet, I. W. Busbridge, M. L. Cartwright, E. F. Collingwood, H. Davenport, H. Heilbronn, A. E. Ingham, R. Rado, R. A. Rankin, W. W. Rogosinski, F. Smithies, E. C. Titchmarsh, and E. M. Wright .
Clarendon Press (Oxford ),
1974 .
MR
0497844 Zbl
0323.01034 book
People
BibTeX
@book {key0497844m,
AUTHOR = {Hardy, G. H.},
TITLE = {Collected papers of {G}.~{H}. {H}ardy},
VOLUME = {6},
PUBLISHER = {Clarendon Press},
ADDRESS = {Oxford},
YEAR = {1974},
PAGES = {xii+854},
NOTE = {Edited by L. S. Bosanquet,
I. W. Busbridge, M. L. Cartwright,
E. F. Collingwood, H. Davenport,
H. Heilbronn, A. E. Ingham,
R. Rado, R. A. Rankin,
W. W. Rogosinski,
F. Smithies, E. C. Titchmarsh,
and E. M. Wright. MR:0497844.
Zbl:0323.01034.},
ISBN = {9780198533405},
}
[94] M. L. Cartwright and H. P. F. Swinnerton-Dyer :
“Boundedness theorems for some second order differential equations, I ,”
Ann. Polon. Math.
29
(1974 ),
pp. 233–258 .
Collection of articles dedicated to the memory of Tadeusz Ważewski, III.
Part IV was published in Russian in Differ. Uravn. 14 :11 (1978)Differ. Equations 14 (1979)
MR
0355191 Zbl
0292.34023 article
People
BibTeX
Henry Peter Francis Swinnerton-Dyer
Related
Tadeusz Ważewski, III
Related
@article {key0355191m,
AUTHOR = {Cartwright, Mary L. and Swinnerton-Dyer,
H. P. F.},
TITLE = {Boundedness theorems for some second
order differential equations, {I}},
JOURNAL = {Ann. Polon. Math.},
FJOURNAL = {Annales Polonici Mathematici. Polska
Akademia Nauk},
VOLUME = {29},
YEAR = {1974},
PAGES = {233--258},
NOTE = {Collection of articles dedicated to
the memory of Tadeusz Wa{\.z}ewski,
III. Part IV was published in Russian
in \textit{Differ. Uravn.} \textbf{14}:11
(1978) and in English in \textit{Differ.
Equations} \textbf{14} (1979). MR:0355191.
Zbl:0292.34023.},
ISSN = {0066-2216},
}
[95] M. L. Cartwright :
“Boundedness of solutions of second order differential equations 67–70
in
Topics in analysis
(Jyväskylä, Finland, 1970 ).
Edited by O. Lehto, I. S. Louhivaara, and R. Nevanlinna .
Lecture Notes in Mathematics 419 .
Springer (Berlin ),
1974 .
MR
0470329 Zbl
0296.34025 incollection
Abstract
People
BibTeX
I have been trying to coordinate various proofs that all solutions of equations of the form
\[ \ddot{x} + kf(x,\dot{x})\dot{x} + g(x) = 0,\qquad \dot{x} = \frac{dx}{dt} \]
are bounded, and to determine whether the bounds of \( x \) and \( \dot{x} \) depend on the parameter \( k \) when \( k \) is very small or very large.
@incollection {key0470329m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Boundedness of solutions of second order
differential equations},
BOOKTITLE = {Topics in analysis},
EDITOR = {Lehto, Olli and Louhivaara, Ilppo Simo
and Nevanlinna, Rolf},
SERIES = {Lecture Notes in Mathematics},
NUMBER = {419},
PUBLISHER = {Springer},
ADDRESS = {Berlin},
YEAR = {1974},
PAGES = {67--70},
DOI = {10.1007/BFb0064711},
NOTE = {(Jyv\"askyl\"a, Finland, 1970). MR:0470329.
Zbl:0296.34025.},
ISSN = {0075-8434},
ISBN = {9783540069652},
}
[96] M. Cartwright :
“Some points in the history of the theory of nonlinear oscillations ,”
Bull. Inst. Math. Appl.
10 : 9–10
(1974 ),
pp. 329–333 .
MR
0532224 article
BibTeX
@article {key0532224m,
AUTHOR = {Cartwright, Mary},
TITLE = {Some points in the history of the theory
of nonlinear oscillations},
JOURNAL = {Bull. Inst. Math. Appl.},
FJOURNAL = {Bulletin of the Institute of Mathematics
and its Applications},
VOLUME = {10},
NUMBER = {9--10},
YEAR = {1974},
PAGES = {329--333},
NOTE = {MR:0532224.},
ISSN = {0905-5628},
}
[97] M. L. Cartwright :
“The Fatou asymptotic values of a function meromorphic in the unit disc and those of its derivative Bull. London Math. Soc.
7 : 1
(1975 ),
pp. 61–64 .
MR
0369700 Zbl
0305.30032 article
BibTeX
@article {key0369700m,
AUTHOR = {Cartwright, M. L.},
TITLE = {The {F}atou asymptotic values of a function
meromorphic in the unit disc and those
of its derivative},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {7},
NUMBER = {1},
YEAR = {1975},
PAGES = {61--64},
DOI = {10.1112/blms/7.1.61},
NOTE = {MR:0369700. Zbl:0305.30032.},
ISSN = {0024-6093},
}
[98] M. Cartwright :
“Some exciting mathematical episodes involving J. E. L. ,”
pp. 201–202
in
Papers presented at the Symposium on Excitement in Mathematics
(Cambridge, 1975 ),
published as Bull. Inst. Math. Appl.
12 : 7
(1976 ).
MR
0532531 incollection
People
BibTeX
@article {key0532531m,
AUTHOR = {Cartwright, Mary},
TITLE = {Some exciting mathematical episodes
involving {J}.~{E}.~{L}.},
JOURNAL = {Bull. Inst. Math. Appl.},
FJOURNAL = {Bulletin of the Institute of Mathematics
and its Applications},
VOLUME = {12},
NUMBER = {7},
YEAR = {1976},
PAGES = {201--202},
NOTE = {\textit{Papers presented at the {S}ymposium
on {E}xcitement in {M}athematics} (Cambridge,
1975). MR:0532531.},
ISSN = {0905-5628},
}
[99] M. L. Cartwright and H. P. F. Swinnerton-Dyer :
“The boundedness of solutions of systems of differential equations ,”
pp. 121–130
in
Differential equations
(Keszthely, Hungary, 2–6 September 1974 ).
Edited by M. Farkas .
Colloquia Mathematica Societatis János Bolyai 15 .
North-Holland (Amsterdam ),
1977 .
MR
0473332 Zbl
0361.34028 incollection
People
BibTeX
@incollection {key0473332m,
AUTHOR = {Cartwright, M. L. and Swinnerton-Dyer,
H. P. F.},
TITLE = {The boundedness of solutions of systems
of differential equations},
BOOKTITLE = {Differential equations},
EDITOR = {Farkas, Mikl\'os},
SERIES = {Colloquia Mathematica Societatis J\'anos
Bolyai},
NUMBER = {15},
PUBLISHER = {North-Holland},
ADDRESS = {Amsterdam},
YEAR = {1977},
PAGES = {121--130},
NOTE = {(Keszthely, Hungary, 2--6 September
1974). MR:0473332. Zbl:0361.34028.},
ISSN = {0139-3383},
ISBN = {9780720404968},
}
[100] M. L. Cartwright :
“A comparison of relationships between various kinds of damping and restoring forces ,”
pp. 93–101
in
Problemy asimptoticheskoĭ teorii nelineĭnykh kolebaniĭ
[Problems of the asymptotic theory of nonlinear oscillations ].
Edited by V. S. Koroliuk .
Naukova Dumka (Kiev ),
1977 .
In Russian.
MR
0594624 Zbl
0497.34025 incollection
People
BibTeX
Vladimir Semenovich Koroliuk
Related
@incollection {key0594624m,
AUTHOR = {Cartwright, M. L.},
TITLE = {A comparison of relationships between
various kinds of damping and restoring
forces},
BOOKTITLE = {Problemy asimptotichesko{\u\i} teorii
neline{\u\i}nykh kolebani{\u\i} [Problems
of the asymptotic theory of nonlinear
oscillations]},
EDITOR = {Koroliuk, V. S.},
PUBLISHER = {Naukova Dumka},
ADDRESS = {Kiev},
YEAR = {1977},
PAGES = {93--101},
NOTE = {In Russian. MR:0594624. Zbl:0497.34025.},
}
[101] M. L. Kartraĭt and H. P. F. Svinnerton-Daĭer :
“Boundedness theorems for some second-order differential equations, IV ,”
Differ. Uravn.
14 : 11
(1978 ),
pp. 1941–1979 .
In Russian.
An English translation was published in Differ. Equations 14 (1979)
MR
516689 article
People
BibTeX
Henry Peter Francis Swinnerton-Dyer
Related
@article {key516689m,
AUTHOR = {Kartra\u\i t, M. L. and Svinnerton-Da\u\i
er, H. P. F.},
TITLE = {Boundedness theorems for some second-order
differential equations, {IV}},
JOURNAL = {Differ. Uravn.},
FJOURNAL = {Differentsial\cprime nye Uravneniya},
VOLUME = {14},
NUMBER = {11},
YEAR = {1978},
PAGES = {1941--1979},
NOTE = {In Russian. An English translation was
published in \textit{Differ. Equations}
\textbf{14} (1979). MR:516689.},
ISSN = {0374-0641},
}
[102] M. L. Cartwright :
“J. E. Littlewood Nature
271 : 5641
(1978 ),
pp. 193 .
article
People
BibTeX
@article {key98865195,
AUTHOR = {Cartwright, Mary L.},
TITLE = {J.~{E}. {L}ittlewood},
JOURNAL = {Nature},
VOLUME = {271},
NUMBER = {5641},
YEAR = {1978},
PAGES = {193},
DOI = {10.1038/271193a0},
}
[103] M. Cartwright :
“John Edensor Littlewood ,”
Bull. Inst. Math. Appl.
14 : 4
(1978 ),
pp. 87–90 .
MR
0497782 article
People
BibTeX
@article {key0497782m,
AUTHOR = {Cartwright, Mary},
TITLE = {John {E}densor {L}ittlewood},
JOURNAL = {Bull. Inst. Math. Appl.},
FJOURNAL = {Bulletin of the Institute of Mathematics
and its Applications},
VOLUME = {14},
NUMBER = {4},
YEAR = {1978},
PAGES = {87--90},
NOTE = {MR:0497782.},
ISSN = {0905-5628},
}
[104] G. H. Hardy :
Collected papers of G. H. Hardy ,
vol. 7 .
Edited by L. S. Bosanquet, I. W. Busbridge, M. L. Cartwright, E. F. Collingwood, H. Davenport, T. M. Flett, H. Heilbronn, A. E. Ingham, R. Rado, R. A. Rankin, W. W. Rogosinski, F. Smithies, E. C. Titchmarsh, and E. M. Wright .
Clarendon Press (Oxford ),
1979 .
MR
527275 Zbl
0396.01024 book
People
BibTeX
@book {key527275m,
AUTHOR = {Hardy, G. H.},
TITLE = {Collected papers of {G}.~{H}. {H}ardy},
VOLUME = {7},
PUBLISHER = {Clarendon Press},
ADDRESS = {Oxford},
YEAR = {1979},
PAGES = {xviii+897},
NOTE = {Edited by L. S. Bosanquet,
I. W. Busbridge, M. L. Cartwright,
E. F. Collingwood, H. Davenport,
T. M. Flett, H. Heilbronn,
A. E. Ingham, R. Rado,
R. A. Rankin, W. W. Rogosinski,
F. Smithies, E. C. Titchmarsh,
and E. M. Wright. MR:527275.
Zbl:0396.01024.},
ISBN = {9780198533474},
}
[105] M. L. Cartwight and H. P. F. Swinnerton-Dyer :
“Boundedness theorems for some second-order differential equations, IV ,”
Differ. Equations
14
(1979 ),
pp. 1378–1406 .
English version of Russian original published in Differ. Uravn. 14 :11 (1978)Ann. Polon. Math. 29 (1974)
Zbl
0429.34037 article
People
BibTeX
Henry Peter Francis Swinnerton-Dyer
Related
@article {key0429.34037z,
AUTHOR = {Cartwight, M. L. and Swinnerton-Dyer,
H. P. F.},
TITLE = {Boundedness theorems for some second-order
differential equations, {IV}},
JOURNAL = {Differ. Equations},
FJOURNAL = {Differential Equations},
VOLUME = {14},
YEAR = {1979},
PAGES = {1378-1406},
NOTE = {English version of Russian original
published in \textit{Differ. Uravn.}
\textbf{14}:11 (1978). Part I was published
in \textit{Ann. Polon. Math.} \textbf{29}
(1974). Zbl:0429.34037.},
ISSN = {0012-2661},
}
[106] M. L. Cartwright :
“Some Hardy–Littlewood manuscripts Bull. London Math. Soc.
13 : 4
(1981 ),
pp. 273–300 .
MR
620040 Zbl
0464.01004 article
Abstract
People
BibTeX
This is an account of work on certain MSS of Hardy and Littlewood in the Wren Library at Trinity College, Cambridge, and in the University Library, Cambridge.
@article {key620040m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Some {H}ardy--{L}ittlewood manuscripts},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {13},
NUMBER = {4},
YEAR = {1981},
PAGES = {273--300},
DOI = {10.1112/blms/13.4.273},
NOTE = {MR:620040. Zbl:0464.01004.},
ISSN = {0024-6093},
CODEN = {LMSBBT},
}
[107] M. L. Cartwright :
“Manuscripts of Hardy, Littlewood, Marcel Riesz and Titchmarsh Bull. London Math. Soc.
14 : 6
(1982 ),
pp. 472–532 .
MR
679927 Zbl
0501.01009 article
Abstract
People
BibTeX
In an earlier article, ‘Some Hardy–Littlewood manuscripts’, this Bulletin , 13 (1981), 273–300, I gave a general account of manuscripts of Hardy and Littlewood in the Library of Trinity College, Cambridge, and the University Library, Cambridge. In this one I consider certain of those manuscripts relating to the earlier stages of ‘the body of work’ referred to by Hardy and Littlewood in ‘Theorems concerning mean values of analytic or harmonic functions’ [1941] as having occupied them ‘at intervals since 1924’.
@article {key679927m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Manuscripts of {H}ardy, {L}ittlewood,
{M}arcel {R}iesz and {T}itchmarsh},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {14},
NUMBER = {6},
YEAR = {1982},
PAGES = {472--532},
DOI = {10.1112/blms/14.6.472},
NOTE = {MR:679927. Zbl:0501.01009.},
ISSN = {0024-6093},
CODEN = {LMSBBT},
}
[108] M. Cartwright :
“Note on A. G. Cock’s paper ‘Chauvinism and internationalism in science’: The International Research Council, 1919–1926 Notes and Records Roy. Soc. London
39 : 1
(1984 ),
pp. 125–128 .
The article in question is Notes and Records Roy. Soc. London 37 :2 (1983), pp. 249–288.
MR
782425 Zbl
0592.01038 article
People
BibTeX
@article {key782425m,
AUTHOR = {Cartwright, Mary},
TITLE = {Note on {A}.~{G}. {C}ock's paper `{C}hauvinism
and internationalism in science': {T}he
{I}nternational {R}esearch {C}ouncil,
1919--1926},
JOURNAL = {Notes and Records Roy. Soc. London},
FJOURNAL = {Notes and Records of the Royal Society
of London. A Journal of the History
of Science},
VOLUME = {39},
NUMBER = {1},
YEAR = {1984},
PAGES = {125--128},
DOI = {10.1098/rsnr.1984.0008},
NOTE = {The article in question is \textit{Notes
and Records Roy. Soc. London} \textbf{37}:2
(1983), pp. 249--288. MR:782425. Zbl:0592.01038.},
ISSN = {0035-9149},
CODEN = {NOREAY},
}
[109] M. L. Cartwright :
“An unsymmetrical van der Pol equation with stable subharmonics Int. J. Non-Linear Mech.
20 : 5–6
(1985 ),
pp. 359–369 .
Zbl
0615.34035 article
Abstract
BibTeX
Possible stable subharmonic solutions of the equation
\[ \ddot{y} - k(1 + 2cy - y^2)\ddot{y} + y = bk\mu\cos\mu t,\qquad c > 0, \]
\( k \) large, are discussed by the techniques used by J. E. Littlewood for van der Pol’s equation in Acta Math. 97 (1957), that is the case of the above equation with \( c = 0 \) and
\[ 0 < \frac{1}{100} < b < \frac{2}{3}-\frac{1}{100}, \]
\( k \) large. Their variation as \( c \) increases is also considered briefly.
@article {key0615.34035z,
AUTHOR = {Cartwright, Mary L.},
TITLE = {An unsymmetrical van der {P}ol equation
with stable subharmonics},
JOURNAL = {Int. J. Non-Linear Mech.},
FJOURNAL = {International Journal of Non-Linear
Mechanics},
VOLUME = {20},
NUMBER = {5--6},
YEAR = {1985},
PAGES = {359--369},
DOI = {10.1016/0020-7462(85)90013-7},
NOTE = {Zbl:0615.34035.},
ISSN = {0020-7462},
}
[110] M. L. Cartwright :
“Later Hardy and Littlewood manuscripts Bull. London Math. Soc.
17 : 4
(1985 ),
pp. 318–390 .
MR
806635 Zbl
0579.01009 article
Abstract
People
BibTeX
This is a continuation of my article ‘Manuscripts of Hardy, Littlewood, Marcel Riesz and Titchmarsh’, this Bulletin 14 (1982) 472–532, about manuscripts relating to the earlier stages of the ‘body of work’ referred to in ‘Theorems concerning mean values of analytic or harmonic functions’ [Hardy 1941].
@article {key806635m,
AUTHOR = {Cartwright, M. L.},
TITLE = {Later {H}ardy and {L}ittlewood manuscripts},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {17},
NUMBER = {4},
YEAR = {1985},
PAGES = {318--390},
DOI = {10.1112/blms/17.4.318},
NOTE = {MR:806635. Zbl:0579.01009.},
ISSN = {0024-6093},
CODEN = {LMSBBT},
}
[111] M. L. Cartwright and G. E. H. Reuter :
“On periodic solutions of van der Pol’s equation with sinusoidal forcing term and large parameter J. London Math. Soc. (2)
36 : 1
(1987 ),
pp. 102–114 .
MR
897678 Zbl
0641.34042 article
People
BibTeX
@article {key897678m,
AUTHOR = {Cartwright, Mary L. and Reuter, G. E.
H.},
TITLE = {On periodic solutions of van der {P}ol's
equation with sinusoidal forcing term
and large parameter},
JOURNAL = {J. London Math. Soc. (2)},
FJOURNAL = {Journal of the London Mathematical Society.
Second Series},
VOLUME = {36},
NUMBER = {1},
YEAR = {1987},
PAGES = {102--114},
DOI = {10.1112/jlms/s2-36.1.102},
NOTE = {MR:897678. Zbl:0641.34042.},
ISSN = {0024-6107},
CODEN = {JLMSAK},
}
[112] M. Cartwright :
“Moments in a girl’s life ,”
Bull. Inst. Math. Appl.
25 : 3–4
(1989 ),
pp. 63–67 .
MR
996106 article
BibTeX
@article {key996106m,
AUTHOR = {Cartwright, Mary},
TITLE = {Moments in a girl's life},
JOURNAL = {Bull. Inst. Math. Appl.},
FJOURNAL = {Bulletin of the Institute of Mathematics
and its Applications},
VOLUME = {25},
NUMBER = {3--4},
YEAR = {1989},
PAGES = {63--67},
NOTE = {MR:996106.},
ISSN = {0905-5628},
CODEN = {IMTABW},
}
[113] N. P. Erugin :
“Mary Lucy Cartwright ,”
Differ. Uravn.
25 : 9
(1989 ),
pp. 1642–1646 .
MR
1024691 Zbl
0673.01013 article
People
BibTeX
@article {key1024691m,
AUTHOR = {Erugin, N. P.},
TITLE = {Mary {L}ucy {C}artwright},
JOURNAL = {Differ. Uravn.},
FJOURNAL = {Differentsial\cprime nye Uravneniya},
VOLUME = {25},
NUMBER = {9},
YEAR = {1989},
PAGES = {1642--1646},
NOTE = {MR:1024691. Zbl:0673.01013.},
ISSN = {0374-0641},
}
[114] S. L. McMurran and J. J. Tattersall :
“The mathematical collaboration of M. L. Cartwright and J. E. Littlewood Amer. Math. Mon.
103 : 10
(1996 ),
pp. 833–845 .
MR
1427114 Zbl
0887.01017 article
People
BibTeX
@article {key1427114m,
AUTHOR = {McMurran, Shawnee L. and Tattersall,
James J.},
TITLE = {The mathematical collaboration of {M}.~{L}.
{C}artwright and {J}.~{E}. {L}ittlewood},
JOURNAL = {Amer. Math. Mon.},
FJOURNAL = {The American Mathematical Monthly},
VOLUME = {103},
NUMBER = {10},
YEAR = {1996},
PAGES = {833--845},
DOI = {10.2307/2974608},
NOTE = {MR:1427114. Zbl:0887.01017.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[115] S. McMurran and J. Tattersall :
“Mary Cartwright (1900–1998) Notices Amer. Math. Soc.
46 : 2
(1999 ),
pp. 214–220 .
MR
1673764 Zbl
0912.01009 article
People
BibTeX
@article {key1673764m,
AUTHOR = {McMurran, Shawnee and Tattersall, James},
TITLE = {Mary {C}artwright (1900--1998)},
JOURNAL = {Notices Amer. Math. Soc.},
FJOURNAL = {Notices of the American Mathematical
Society},
VOLUME = {46},
NUMBER = {2},
YEAR = {1999},
PAGES = {214--220},
URL = {http://www.ams.org/notices/199902/mem-cartwright.pdf},
NOTE = {MR:1673764. Zbl:0912.01009.},
ISSN = {0002-9920},
CODEN = {AMNOAN},
}
[116] J. Tattersall and S. McMurran :
“An interview with Dame Mary L. Cartwright, D.B.E., F.R.S College Math. J.
32 : 4
(2001 ),
pp. 242–254 .
MR
1860301 Zbl
0998.01551 article
Abstract
People
BibTeX
@article {key1860301m,
AUTHOR = {Tattersall, James and McMurran, Shawnee},
TITLE = {An interview with {D}ame {M}ary~{L}.
{C}artwright, {D}.{B}.{E}., {F}.{R}.{S}},
JOURNAL = {College Math. J.},
FJOURNAL = {The College Mathematics Journal},
VOLUME = {32},
NUMBER = {4},
YEAR = {2001},
PAGES = {242--254},
DOI = {10.2307/2687556},
NOTE = {MR:1860301. Zbl:0998.01551.},
ISSN = {0746-8342},
}
[117] T. Körner :
“Mary Cartwright ,”
Chapter 19 ,
pp. 282–298
in
Cambridge scientific minds .
Edited by P. Harman and S. Mitton .
Cambridge University Press ,
2002 .
MR
2132156 incollection
People
BibTeX
@incollection {key2132156m,
AUTHOR = {K{\"o}rner, Tom},
TITLE = {Mary {C}artwright},
BOOKTITLE = {Cambridge scientific minds},
EDITOR = {Harman, Peter and Mitton, Simon},
CHAPTER = {19},
PUBLISHER = {Cambridge University Press},
YEAR = {2002},
PAGES = {282--298},
NOTE = {MR:2132156.},
ISBN = {9780521786126},
}
[118] W. K. Hayman :
“Mary Lucy Cartwright (1900–1998) Bull. London Math. Soc.
34 : 1
(2002 ),
pp. 91–107 .
MR
1866432 Zbl
1032.01034 article
Abstract
People
BibTeX
Mary Cartwright with J. E. Littlewood FRS first observed the phenomena which developed into chaos theory. Thus she had a significant effect on the modern world. She was the only woman so far to be a president of the London Mathematical Society, one of the first to be a Fellow of the Royal Society, and the first woman to serve on its Council. She was born on 17 December 1900 and died on 3 April 1998.
@article {key1866432m,
AUTHOR = {Hayman, W. K.},
TITLE = {Mary {L}ucy {C}artwright (1900--1998)},
JOURNAL = {Bull. London Math. Soc.},
FJOURNAL = {The Bulletin of the London Mathematical
Society},
VOLUME = {34},
NUMBER = {1},
YEAR = {2002},
PAGES = {91--107},
DOI = {10.1112/S0024609301008578},
NOTE = {MR:1866432. Zbl:1032.01034.},
ISSN = {0024-6093},
CODEN = {LMSBBT},
}
[119] M. L. Cartwright :
“Titchmarsh, Edward Charles (1899–1963) Oxford dictionary of national biography ,
new edition,
vol. 61 .
Edited by H. C. G. Matthew and B. H. Harrison .
Oxford University Press ,
2004 .
Abbreviated version of obituary published in J. London Math. Soc. 39 :1 (1964)Biograph. Mem. of Fell. of the Roy. Soc. 10 (1964)
incollection
People
BibTeX
@incollection {key50628896,
AUTHOR = {Cartwright, M. L.},
TITLE = {Titchmarsh, {E}dward {C}harles (1899--1963)},
BOOKTITLE = {Oxford dictionary of national biography},
EDITOR = {Matthew, Henry Colin Gray and Harrison,
Brian Howard},
VOLUME = {61},
EDITION = {new},
PUBLISHER = {Oxford University Press},
YEAR = {2004},
DOI = {10.1093/ref:odnb/36526},
NOTE = {Abbreviated version of obituary published
in \textit{J. London Math. Soc.} \textbf{39}:1
(1964) and in \textit{Biograph. Mem.
of Fell. of the Roy. Soc.} \textbf{10}
(1964).},
ISBN = {9780198614135},
}
