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[1] R. E. Greenwood and A. M. Gleason :
“Binomial identities Am. Math. Mon.
53 : 1
(January 1946 ),
pp. 24–27 .
From the “Discussions and Notes” column of the journal.
MR
1526364 article
Abstract
People
BibTeX
Robert Ewing Greenwood, Jr.
Related
@article {key1526364m,
AUTHOR = {Greenwood, R. E. and Gleason, A. M.},
TITLE = {Binomial identities},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {53},
NUMBER = {1},
MONTH = {January},
YEAR = {1946},
PAGES = {24--27},
DOI = {10.2307/2306082},
NOTE = {From the ``Discussions and Notes'' column
of the journal. MR:1526364.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[2] A. M. Gleason :
“Square roots in locally Euclidean groups Bull. Am. Math. Soc.
55 : 4
(1949 ),
pp. 446–449 .
MR
0028841 Zbl
0041.16002 article
Abstract
BibTeX
A possible attack on the fifth problem of Hilbert is to demonstrate the existence of one-parameter subgroups in any locally Euclidean group. It is known that, provided there are no “small” subgroups, some one-parameter subgroups exist. One would like to prove, however, that in a suitable neighborhood of the identity, every elementis on one and only one one-parameter subgroup. If this is true, it is possible to extract square roots (that is, solve \( x^2 = a \) for given \( a \) ) uniquely in this neighborhood, and the sequence of successive square roots \( a \) , \( a^{1/2} \) , \( (a^{1/2}){}^{1/2},\dots \) converges to the identity. Conversely, it is easily seen that, if unique square roots exist, and if the sequence of square roots converge to the identity, then the one-parameter subgroups can be found. In this paper we give a new proof that square roots exist in a suitable neighborhood of the identity and show, in addition, that either they are unique or small subgroups exist.
@article {key0028841m,
AUTHOR = {Gleason, A. M.},
TITLE = {Square roots in locally {E}uclidean
groups},
JOURNAL = {Bull. Am. Math. Soc.},
FJOURNAL = {Bulletin of American Mathematical Society},
VOLUME = {55},
NUMBER = {4},
YEAR = {1949},
PAGES = {446--449},
DOI = {10.1090/S0002-9904-1949-09237-6},
NOTE = {MR:0028841. Zbl:0041.16002.},
ISSN = {0002-9904},
}
[3] A. M. Gleason :
“On the structure of locally compact groups Proc. Natl. Acad. Sci. U.S.A.
35 : 7
(July 1949 ),
pp. 384–386 .
MR
0029910 Zbl
0033.15105 article
Abstract
BibTeX
Locally compact groups have attracted a great deal of study in the years since the introductino of invariant integration by Haar [1933]. It has been shown that their structure is closely related to that of Lie groups in certain important cases (compact [Von Neumann 1933; Van Kampen 1935], abelian [Pontrjagin 1934] and solvable [Malcev 1946] groups), and it is widely conjectured that similar results are valid in general. We shall state here certain theorems which strengthen this conjecture and reduce its verification to the study of simple groups.
@article {key0029910m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {On the structure of locally compact
groups},
JOURNAL = {Proc. Natl. Acad. Sci. U.S.A.},
FJOURNAL = {Proceedings of the National Academy
of Sciences of the United States of
America},
VOLUME = {35},
NUMBER = {7},
MONTH = {July},
YEAR = {1949},
PAGES = {384--386},
DOI = {10.1073/pnas.35.7.384},
NOTE = {MR:0029910. Zbl:0033.15105.},
ISSN = {0027-8424},
}
[4] A. M. Gleason :
“A note on locally compact groups Bull. Am. Math. Soc.
55 : 8
(1949 ),
pp. 744–745 .
MR
0030958 Zbl
0034.30602 article
Abstract
BibTeX
In this note we shall prove that every locally compact group can be embedded as a closed subgroup in a unimodular group. If the original group is locally Euclidean, the enlarged group will be also, hence the fifth problem of Hilbert is reduced to the unimodular case.
@article {key0030958m,
AUTHOR = {Gleason, A. M.},
TITLE = {A note on locally compact groups},
JOURNAL = {Bull. Am. Math. Soc.},
FJOURNAL = {Bulletin of American Mathematical Society},
VOLUME = {55},
NUMBER = {8},
YEAR = {1949},
PAGES = {744--745},
DOI = {10.1090/S0002-9904-1949-09274-1},
NOTE = {MR:0030958. Zbl:0034.30602.},
ISSN = {0002-9904},
}
[5] A. M. Gleason :
“A note on a theorem of Helson Colloq. Math.
2
(1949 ),
pp. 5–6 .
MR
0038406 Zbl
0038.03105 article
Abstract
BibTeX
Helson has proved the following theorem [1948]:
If \( \circ \) is a group operator on the subsets of a set \( M \) with zero the empty set, invariant under simple transformations, and such that \( A\circ B \subset A + B \) for all subsets \( A,B \) of \( M \) , then \( \circ \) is symmetric difference.
The purpose of this note is to strengthen his result by dropping the requirement about zero as the empty set and the invariance of \( \circ \) under simple transformations.
@article {key0038406m,
AUTHOR = {Gleason, A. M.},
TITLE = {A note on a theorem of {H}elson},
JOURNAL = {Colloq. Math.},
FJOURNAL = {Colloquium Mathematicum},
VOLUME = {2},
YEAR = {1949},
PAGES = {5--6},
URL = {http://matwbn.icm.edu.pl/ksiazki/cm/cm2/cm212.pdf},
NOTE = {MR:0038406. Zbl:0038.03105.},
ISSN = {0010-1354},
}
[6] A. M. Gleason :
“Arcs in locally compact groups Proc. Natl. Acad. Sci. U.S.A.
36 : 11
(November 1950 ),
pp. 663–667 .
MR
0038356 Zbl
0040.15301 article
Abstract
BibTeX
We outline the proof of a theorem useful in the topological investigation of groups: namely, that every locally compact group which is not totally disconnected contains an arc. With the aid of this theorem we are able to prove that every finite dimensional, locally compact group contains a one-parameter subgroup. These results accord with the conjecture that every locally compact group is a generalized Lie group [Gleason 1949; Iwasawa 1949].
@article {key0038356m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Arcs in locally compact groups},
JOURNAL = {Proc. Natl. Acad. Sci. U.S.A.},
FJOURNAL = {Proceedings of the National Academy
of Sciences of the United States of
America},
VOLUME = {36},
NUMBER = {11},
MONTH = {November},
YEAR = {1950},
PAGES = {663--667},
DOI = {10.1073/pnas.36.11.663},
NOTE = {MR:0038356. Zbl:0040.15301.},
ISSN = {0027-8424},
}
[7] A. M. Gleason :
“Spaces with a compact Lie group of transformations Proc. Am. Math. Soc.
1 : 1
(1950 ),
pp. 35–43 .
An erratum for this article was published in Proc. Am. Math. Soc. 1 :6 (1950)
MR
0033830 Zbl
0041.36207 article
Abstract
BibTeX
A topological group \( \mathfrak{G} \) is said to act on a topological space \( \mathcal{R} \) if the elements of \( \mathfrak{G} \) are homeomorphisms of \( \mathcal{R} \) onto itself and if the mapping \( (\sigma,p)\to \sigma(p) \) of \( \mathfrak{G} \times \mathcal{R} \) onto \( \mathcal{R} \) is continuous. Familiar examples include the rotation group acting on the Cartesian plane and the Euclidean group acting on Euclidean space. The set \( \mathcal{R}(p) \) (that is, the set of all \( \sigma(p) \) where \( \sigma\in\mathfrak{G} \) ) is called the orbit of \( p \) . If \( p \) and \( q \) are two points of \( \mathcal{R} \) , then \( \mathfrak{G}(p) \) and \( \mathfrak{G}(q) \) are either identical or disjoint, hence \( \mathcal{R} \) is partitioned by the orbits. The topological structure of the partition becomes an interesting question. In the case of the rotations of the Cartesian plane we find that, excising the singularity at the origin, the remainder of space is fibered as a direct product. A similar result is easily established for a compact Lie group acting analytically on an analytic manifold. In this paper we make use of Haar measure to extend this result to the case of a compact Lie group acting on any completely regular space.
@article {key0033830m,
AUTHOR = {Gleason, A. M.},
TITLE = {Spaces with a compact {L}ie group of
transformations},
JOURNAL = {Proc. Am. Math. Soc.},
FJOURNAL = {Proceedings of American Mathematical
Society},
VOLUME = {1},
NUMBER = {1},
YEAR = {1950},
PAGES = {35--43},
DOI = {10.2307/2032430},
NOTE = {An erratum for this article was published
in \textit{Proc. Am. Math. Soc.} \textbf{1}:6
(1950). MR:0033830. Zbl:0041.36207.},
ISSN = {0002-9939},
}
[8] A. M. Gleason :
“Erratum: ‘Spaces with a compact Lie group of transformations’ Proc. Am. Math. Soc.
1 : 6
(1950 ),
pp. 826 .
Erratum for an article published in Proc. Am. Math. Soc. 1 :1 (1950)
article
BibTeX
@article {key35264152,
AUTHOR = {Gleason, A. M.},
TITLE = {Erratum: ``{S}paces with a compact {L}ie
group of transformations''},
JOURNAL = {Proc. Am. Math. Soc.},
FJOURNAL = {Proceedings of American Mathematical
Society},
VOLUME = {1},
NUMBER = {6},
YEAR = {1950},
PAGES = {826},
DOI = {10.1090/S0002-9939-50-99957-6},
NOTE = {Erratum for an article published in
\textit{Proc. Am. Math. Soc.} \textbf{1}:1
(1950).},
ISSN = {0002-9939},
}
[9] A. M. Gleason :
“Compact subgroups Proc. Natl. Acad. Sci. U.S.A.
37 : 9
(September 1951 ),
pp. 622–623 .
MR
0043102 Zbl
0043.26401 article
Abstract
BibTeX
Every connected compact subgroup of a locally compact group is contained in a maximal connected compact subgroup.
For connected (L)-groups (locally compact groups which are projective limits of Lie groups) Iwasawa [1949] has shown the existence of maximal compact subgroups and that all of these are conjugate. His proof relies on analytic investigation of the approximating Lie groups. Our proof uses only methods of group theory and topology and leads to a much weaker result, which, however, strengthens the standing conjecture that all connected locally compact groups are (L)-groups.
@article {key0043102m,
AUTHOR = {Gleason, A. M.},
TITLE = {Compact subgroups},
JOURNAL = {Proc. Natl. Acad. Sci. U.S.A.},
FJOURNAL = {Proceedings of the National Academy
of Sciences of the United States of
America},
VOLUME = {37},
NUMBER = {9},
MONTH = {September},
YEAR = {1951},
PAGES = {622--623},
DOI = {10.1073/pnas.37.9.622},
NOTE = {MR:0043102. Zbl:0043.26401.},
ISSN = {0027-8424},
}
[10] A. M. Gleason :
“The structure of locally compact groups Duke Math. J.
18 : 1
(1951 ),
pp. 85–104 .
MR
0039730 Zbl
0044.01901 article
Abstract
BibTeX
Since the introduction of Haar measure great strides have been made toward understanding the structure of locally compact groups. Perhaps the most striking fact yet discovered is the close relationship which exists between Lie groups and certain special classes of locally compact groups; viz. , compact, Abelian or solvable groups. It is widely conjectured that similar relationships hold in general. In this paper we shall prove several theorems which strengthen this conjecture and reduce its verification to the study of simple groups.
@article {key0039730m,
AUTHOR = {Gleason, A. M.},
TITLE = {The structure of locally compact groups},
JOURNAL = {Duke Math. J.},
FJOURNAL = {Duke Mathematical Journal},
VOLUME = {18},
NUMBER = {1},
YEAR = {1951},
PAGES = {85--104},
DOI = {10.1215/S0012-7094-51-01808-X},
NOTE = {MR:0039730. Zbl:0044.01901.},
ISSN = {0012-7094},
}
[11] A. M. Gleason :
“One-parameter subgroups and Hilbert’s fifth problem 451–452
in
Proceedings of the International Congress of Mathematicians
(Cambridge, MA, 30 August–6 September 1950 ),
vol. 2 .
American Mathematical Society (Providence, RI ),
1952 .
MR
0043788 Zbl
0048.25503 incollection
BibTeX
@incollection {key0043788m,
AUTHOR = {Gleason, A. M.},
TITLE = {One-parameter subgroups and {H}ilbert's
fifth problem},
BOOKTITLE = {Proceedings of the {I}nternational {C}ongress
of {M}athematicians},
VOLUME = {2},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1952},
PAGES = {451--452},
URL = {http://www.mathunion.org/ICM/ICM1950.2/Main/icm1950.2.0451.0452.ocr.pdf},
NOTE = {(Cambridge, MA, 30 August--6 September
1950). MR:0043788. Zbl:0048.25503.},
}
[12] A. M. Gleason :
“Groups without small subgroups Ann. Math. (2)
56 : 2
(September 1952 ),
pp. 193–212 .
MR
0049203 Zbl
0049.30105 article
Abstract
BibTeX
@article {key0049203m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Groups without small subgroups},
JOURNAL = {Ann. Math. (2)},
FJOURNAL = {Annals of Mathematics. Second Series},
VOLUME = {56},
NUMBER = {2},
MONTH = {September},
YEAR = {1952},
PAGES = {193--212},
DOI = {10.2307/1969795},
NOTE = {MR:0049203. Zbl:0049.30105.},
ISSN = {0003-486X},
}
[13] R. E. Greenwood and A. M. Gleason :
“Distribution of round-off errors for running averages Pac. J. Math.
3 : 3
(May 1953 ),
pp. 605–611 .
MR
0056860 Zbl
0051.10401 article
People
BibTeX
Robert Ewing Greenwood, Jr.
Related
@article {key0056860m,
AUTHOR = {Greenwood, R. E. and Gleason, A. M.},
TITLE = {Distribution of round-off errors for
running averages},
JOURNAL = {Pac. J. Math.},
FJOURNAL = {Pacific Journal of Mathematics},
VOLUME = {3},
NUMBER = {3},
MONTH = {May},
YEAR = {1953},
PAGES = {605--611},
DOI = {10.2140/pjm.1953.3.605},
NOTE = {MR:0056860. Zbl:0051.10401.},
ISSN = {0030-8730},
}
[14] A. M. Gleason :
“The expanding role of mathematics Enseignement Math. (2)
1
(1955 ),
pp. 188–191 .
MR
0075117 Zbl
0066.24204 article
BibTeX
@article {key0075117m,
AUTHOR = {Gleason, A. M.},
TITLE = {The expanding role of mathematics},
JOURNAL = {Enseignement Math. (2)},
FJOURNAL = {L'Enseignement Math\'ematique. Revue
Internationale. IIe S\'erie},
VOLUME = {1},
YEAR = {1955},
PAGES = {188--191},
DOI = {10.5169/seals-31362},
NOTE = {MR:0075117. Zbl:0066.24204.},
ISSN = {0013-8584},
}
[15] R. E. Greenwood and A. M. Gleason :
“Combinatorial relations and chromatic graphs Can. J. Math.
7
(1955 ),
pp. 1–7 .
MR
0067467 Zbl
0064.17901 article
People
BibTeX
Robert Ewing Greenwood, Jr.
Related
@article {key0067467m,
AUTHOR = {Greenwood, R. E. and Gleason, A. M.},
TITLE = {Combinatorial relations and chromatic
graphs},
JOURNAL = {Can. J. Math.},
FJOURNAL = {Canadian Journal of Mathematics},
VOLUME = {7},
YEAR = {1955},
PAGES = {1--7},
DOI = {10.4153/CJM-1955-001-4},
NOTE = {MR:0067467. Zbl:0064.17901.},
ISSN = {0008-414X},
}
[16] Lie algebras and Lie groups
(Waterville, ME, 20 June–31 July 31, 1953 ).
Edited by A. M. Gleason .
Memoirs of the American Mathematical Society 14 .
American Mathematical Society (Providence, RI ),
1955 .
Five papers prepared in connection with the first AMS Summer Mathematical Institute.
book
BibTeX
@book {key61824192,
TITLE = {Lie algebras and {L}ie groups},
EDITOR = {Gleason, Andrew M.},
SERIES = {Memoirs of the American Mathematical
Society},
NUMBER = {14},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1955},
NOTE = {(Waterville, ME, 20 June--31 July 31,
1953). Five papers prepared in connection
with the first AMS Summer Mathematical
Institute.},
}
[17] A. M. Gleason :
“Finite Fano planes Am. J. Math.
78 : 4
(October 1956 ),
pp. 797–807 .
MR
0082684 Zbl
0072.38001 article
BibTeX
@article {key0082684m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Finite {F}ano planes},
JOURNAL = {Am. J. Math.},
FJOURNAL = {American Journal of Mathematics},
VOLUME = {78},
NUMBER = {4},
MONTH = {October},
YEAR = {1956},
PAGES = {797--807},
DOI = {10.2307/2372469},
NOTE = {MR:0082684. Zbl:0072.38001.},
ISSN = {0002-9327},
}
[18] A. M. Gleason :
“Measures on the closed subspaces of a Hilbert space J. Math. Mech.
6 : 4
(1957 ),
pp. 885–893 .
MR
0096113 Zbl
0078.28803 article
Abstract
BibTeX
In his investigations of the mathematical foundations of quantum mechanics, Mackey [1957] has proposed the following problem: Determine all measures on the closed subspaces of a Hilbert space. A measure on the closed subspaces means a function \( \mu \) which assigns to every closed subspace a non-negative real number such that if \( \{A_i\} \) is a countable collection of mutually orthogonal subspaces having closed linear span \( B \) , then
\[ \mu(B) = \sum\mu(A_i). \]
It is easy to see that such a measure can be obtained by selecting a vector \( v \) and, for each closed subspace \( A \) , taking \( \mu(A) \) as the square of the norm of the projection of \( v \) on \( A \) . Positive linear combinations of such measures lead to more examples and, passing to the limit, one finds that, for every positive semidefinite self-adjoint operator \( T \) of the trace class,
\[ \mu(A) = \operatorname{trace}(TP_A), \]
where \( P_A \) denotes the orthogonal projection on \( A \) , defines a measure on the closed subspaces. It is the purpose of this paper to show that, in a separable Hilbert space of dimension at least three, whether real or complex, every measure on the closed subspaces is derived in this fashion.
@article {key0096113m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Measures on the closed subspaces of
a {H}ilbert space},
JOURNAL = {J. Math. Mech.},
FJOURNAL = {Journal of Mathematics and Mechanics},
VOLUME = {6},
NUMBER = {4},
YEAR = {1957},
PAGES = {885--893},
DOI = {10.1512/iumj.1957.6.56050},
NOTE = {MR:0096113. Zbl:0078.28803.},
ISSN = {0095-9057},
}
[19] A. M. Gleason and R. S. Palais :
“On a class of transformation groups Am. J. Math.
79 : 3
(July 1957 ),
pp. 631–648 .
MR
0089367 Zbl
0084.03203 article
Abstract
People
BibTeX
@article {key0089367m,
AUTHOR = {Gleason, Andrew M. and Palais, Richard
S.},
TITLE = {On a class of transformation groups},
JOURNAL = {Am. J. Math.},
FJOURNAL = {American Journal of Mathematics},
VOLUME = {79},
NUMBER = {3},
MONTH = {July},
YEAR = {1957},
PAGES = {631--648},
DOI = {10.2307/2372567},
NOTE = {MR:0089367. Zbl:0084.03203.},
ISSN = {0002-9327},
}
[20]
R. W. Marsh and A. M. Gleason :
“A method for generating irreducible polynomials MAA Monthly
(1957 ),
pp. 747–748 .
Problem 4709.
article
People
BibTeX
@article {key36702061,
AUTHOR = {R. W. Marsh and A. M. Gleason},
TITLE = {A method for generating irreducible
polynomials},
JOURNAL = {MAA Monthly},
YEAR = {1957},
PAGES = {747--748},
DOI = {10.1080/00029890.1957.11989096},
NOTE = {Problem 4709.},
}
[21] A. M. Gleason :
“Function algebras ,”
pp. 213–226
in
Seminars on analytic functions
(Princeton, NJ, 1958 ),
vol. 2 .
1958 .
Zbl
0095.10103 incollection
BibTeX
@incollection {key0095.10103z,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Function algebras},
BOOKTITLE = {Seminars on analytic functions},
VOLUME = {2},
YEAR = {1958},
PAGES = {213--226},
NOTE = {(Princeton, NJ, 1958). Zbl:0095.10103.},
}
[22] A. M. Gleason :
“A metric for the space of function elements Am. Math. Mon.
65 : 10
(December 1958 ),
pp. 756–758 .
From the “Mathematical Notes” column of the journal.
MR
0100663 Zbl
0083.06303 article
BibTeX
@article {key0100663m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {A metric for the space of function elements},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {65},
NUMBER = {10},
MONTH = {December},
YEAR = {1958},
PAGES = {756--758},
DOI = {10.2307/2310678},
NOTE = {From the ``Mathematical Notes'' column
of the journal. MR:0100663. Zbl:0083.06303.},
ISSN = {0002-9890},
}
[23] A. M. Gleason :
“Projective topological spaces Ill. J. Math.
2 : 4A
(December 1958 ),
pp. 482–489 .
MR
0121775 Zbl
0083.17401 article
Abstract
BibTeX
Suppose we have given a category of topological spaces and continuous maps. Let \( X \) , \( Y \) , and \( Z \) be admissible spaces and \( \phi \) and \( f \) admissible maps of \( X \) into \( Z \) and \( Y \) into \( Z \) respectively. A natural question is whether or not there exists an admissible map \( \psi \) of \( X \) into \( Y \) such that \( \phi = f\circ \psi \) . One can hardly expect to answer such a question without explicit knowledge of all the data, but it may happen that, for certain spaces \( X \) , the answer is always yes provided \( f \) satisfies the minimum condition of mappying \( Y \) onto \( Z \) . Discrete spaces are examples in the category of all spaces and continuous maps. Following the terminology of homological algebra, we shall call such a space projective. In this paper we will determine the projective spaces in the category of compact spaces and continuous maps and discuss the notion of projective resolution for these spaces.
@article {key0121775m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Projective topological spaces},
JOURNAL = {Ill. J. Math.},
FJOURNAL = {Illinois Journal of Mathematics},
VOLUME = {2},
NUMBER = {4A},
MONTH = {December},
YEAR = {1958},
PAGES = {482--489},
URL = {http://projecteuclid.org/euclid.ijm/1255454110},
NOTE = {MR:0121775. Zbl:0083.17401.},
ISSN = {0019-2082},
}
[24] A. M. Gleason :
“A search problem in the \( n \) -cube ,”
pp. 175–178
in
Combinatorial analysis
(Columbia University, New York, 24–26 April 1958 ).
Edited by R. Bellman and M. Hall, Jr.
Proceedings of Symposia in Applied Mathematics 10 .
American Mathematical Society (Providence, RI ),
1960 .
MR
0114323 Zbl
0096.14605 incollection
People
BibTeX
@incollection {key0114323m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {A search problem in the \$n\$-cube},
BOOKTITLE = {Combinatorial analysis},
EDITOR = {Bellman, Richard and Hall, Jr., Marshall},
SERIES = {Proceedings of Symposia in Applied Mathematics},
NUMBER = {10},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1960},
PAGES = {175--178},
NOTE = {(Columbia University, New York, 24--26
April 1958). MR:0114323. Zbl:0096.14605.},
ISSN = {0160-7634},
ISBN = {9780821892251},
}
[25] A. M. Gleason :
“Undergraduate training for graduate study Am. Math. Mon.
68 : 9
(November 1961 ),
pp. 923–925 .
From the “Mathematical education notes” column of the journal.
MR
1531434 article
BibTeX
@article {key1531434m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Undergraduate training for graduate
study},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {68},
NUMBER = {9},
MONTH = {November},
YEAR = {1961},
PAGES = {923--925},
DOI = {10.2307/2311709},
NOTE = {From the ``Mathematical education notes''
column of the journal. MR:1531434.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[26]
A. M. Gleason :
Factorization of polynomials over finite fields with particular reference to the cyclotomic
polynomials .
Typescript preprint ,
1961 .
techreport
BibTeX
@techreport {key84968755,
AUTHOR = {A. M. Gleason},
TITLE = {Factorization of polynomials over finite
fields with particular reference to
the cyclotomic polynomials},
TYPE = {typescript preprint},
YEAR = {1961},
}
[27] A. M. Gleason and H. Whitney :
“The extension of linear functionals defined on \( H^{\infty} \) Pacific J. Math.
12 : 1
(1962 ),
pp. 163–182 .
Dedicated to Marston Morse.
MR
0142013 Zbl
0191.15202 article
Abstract
People
BibTeX
We consider the Banach space \( L^{\infty} \) of (classes of) bounded measurable complex functions on the unit circle \( \Gamma_1 \) . It has a subspace \( H = H^{\infty} \) consisting of those functions \( h \) which are the boundary value functions (existing almost everywhere by Fatou’s theorem) of bounded analytic functions \( \hat{h} \) in the interior \( S_1 \) of \( \Gamma_1 \) . By the Hahn–Banach theorem, any bounded linear functional \( \varphi \) defined on \( H^{\infty} \) can be extended over \( L^{\infty} \) with no increase in norm. It is the primary purpose of this paper to prove that this extension is unique, provided that \( \varphi \) is defined (over \( H \) ) by an integral with kernel in \( L^1 \) . Without this hypothesis, uniqueness may fail.
@article {key0142013m,
AUTHOR = {Gleason, Andrew M. and Whitney, Hassler},
TITLE = {The extension of linear functionals
defined on \$H^{\infty}\$},
JOURNAL = {Pacific J. Math.},
FJOURNAL = {Pacific Journal of Mathematics},
VOLUME = {12},
NUMBER = {1},
YEAR = {1962},
PAGES = {163--182},
DOI = {10.2140/pjm.1962.12.163},
NOTE = {Dedicated to Marston Morse. MR:0142013.
Zbl:0191.15202.},
ISSN = {0030-8730},
}
[28] A. M. Gleason :
“The abstract theorem of Cauchy–Weil Pac. J. Math.
12 : 2
(February 1962 ),
pp. 511–525 .
MR
0147672 Zbl
0117.09302 article
BibTeX
@article {key0147672m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {The abstract theorem of {C}auchy--{W}eil},
JOURNAL = {Pac. J. Math.},
FJOURNAL = {Pacific Journal of Mathematics},
VOLUME = {12},
NUMBER = {2},
MONTH = {February},
YEAR = {1962},
PAGES = {511--525},
DOI = {10.2140/pjm.1962.12.511},
NOTE = {MR:0147672. Zbl:0117.09302.},
ISSN = {0030-8730},
}
[29] A. M. Gleason :
“On groups of homeomorphisms ,”
pp. 39–44
in
Algebraical and topological foundations of geometry
(Utrecht, August 1959 ).
Pergamon (Oxford ),
1962 .
MR
0149461 Zbl
0107.02702 incollection
BibTeX
@incollection {key0149461m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {On groups of homeomorphisms},
BOOKTITLE = {Algebraical and topological foundations
of geometry},
PUBLISHER = {Pergamon},
ADDRESS = {Oxford},
YEAR = {1962},
PAGES = {39--44},
NOTE = {(Utrecht, August 1959). MR:0149461.
Zbl:0107.02702.},
ISBN = {},
}
[30] A. M. Gleason and R. P. Dilworth :
“A generalized Cantor theorem Proc. Am. Math. Soc.
13 : 5
(1962 ),
pp. 704–705 .
MR
0144824 Zbl
0109.24203 article
People
BibTeX
@article {key0144824m,
AUTHOR = {Gleason, A. M. and Dilworth, R. P.},
TITLE = {A generalized {C}antor theorem},
JOURNAL = {Proc. Am. Math. Soc.},
FJOURNAL = {Proceedings of American Mathematical
Society},
VOLUME = {13},
NUMBER = {5},
YEAR = {1962},
PAGES = {704--705},
DOI = {10.2307/2034158},
NOTE = {MR:0144824. Zbl:0109.24203.},
ISSN = {0002-9939},
}
[31] A. M. Gleason :
“Finding the maximum of a continuous function ,”
pp. 198–202
in
Proceedings of a Harvard symposium on digital computers and their applications
(Cambridge, MA, 3–6 April 1961 ).
Edited by A. G. Oettinger .
Annals of the Computation Laboratory of Harvard University 31 .
Harvard University Press (Cambridge, MA ),
1962 .
MR
0221739 Zbl
0137.03605 incollection
People
BibTeX
@incollection {key0221739m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Finding the maximum of a continuous
function},
BOOKTITLE = {Proceedings of a {H}arvard symposium
on digital computers and their applications},
EDITOR = {Oettinger, Anthony G.},
SERIES = {Annals of the Computation Laboratory
of Harvard University},
NUMBER = {31},
PUBLISHER = {Harvard University Press},
ADDRESS = {Cambridge, MA},
YEAR = {1962},
PAGES = {198--202},
NOTE = {(Cambridge, MA, 3--6 April 1961). MR:0221739.
Zbl:0137.03605.},
ISSN = {0073-0750},
}
[32] A. M. Gleason :
“Universal locally connected refinements Ill. J. Math.
7 : 3
(1963 ),
pp. 521–531 .
MR
0164315 Zbl
0117.16101 article
Abstract
BibTeX
@article {key0164315m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Universal locally connected refinements},
JOURNAL = {Ill. J. Math.},
FJOURNAL = {Illinois Journal of Mathematics},
VOLUME = {7},
NUMBER = {3},
YEAR = {1963},
PAGES = {521--531},
URL = {http://projecteuclid.org/euclid.ijm/1255644959},
NOTE = {MR:0164315. Zbl:0117.16101.},
ISSN = {0019-2082},
}
[33] A. M. Gleason :
“The Cauchy–Weil theorem J. Math. Mech.
12 : 3
(1963 ),
pp. 429–444 .
MR
0148938 Zbl
0122.32002 article
Abstract
BibTeX
Of fundamental importance in the theory of several complex variables is an integral representatin formula similar to the familiar Cauchy formula in the complex plane. Various such formulas have been given by Bergmann [1934a, 1934b], Weil [1935], Hervé [1952], Arens [1956], and the author [1962]. Of these the form sketched by Weil is the most elegant, but there are some difficulties with his proof. The object of this paper is to prove an integral formula from which Weil’s follows immediately whenever the triangulation assumption of his proof is valid. Aren’s form of the theorem, in which the topological difficulties are obviated by allowing the path of integration to stray from the boundary of the region, is also an easy corollary of the present result.
@article {key0148938m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {The {C}auchy--{W}eil theorem},
JOURNAL = {J. Math. Mech.},
FJOURNAL = {Journal of Mathematics and Mechanics},
VOLUME = {12},
NUMBER = {3},
YEAR = {1963},
PAGES = {429--444},
DOI = {10.1512/iumj.1963.12.12028},
NOTE = {MR:0148938. Zbl:0122.32002.},
ISSN = {0095-9057},
}
[34] A. M. Gleason :
“Finitely generated ideals in Banach algebras J. Math. Mech.
13 : 1
(1964 ),
pp. 125–132 .
MR
0159241 Zbl
0117.34105 article
Abstract
BibTeX
Let \( A \) be a Banach algebra. There are two senses in which we may say that \( A \) is finitely generated. It may be that there is a finite set \( F \) in \( A \) such that \( A \) is the least subalgebra containing \( F \) . Or it may be that \( A \) is the least closed subalgebra containing \( F \) . The former situation occurs only when \( A \) is finite-dimensional; the latter characterizes algebras obtained by completing a polynomial algebra in a finite number of variables with respect to a pseudo-norm.
Similarly, and ideal \( I \) of \( A \) may be finitely generated in two senses; it may be the least ideal containing a certain finite set \( F \) or it may be the least closed ideal containing \( F \) . Again the former situation, which we may call algebraically finitely generated, is rare, and the latter, or topologically finitely generated, case is common. However, algebraically finitely generated ideals are not trivial. This paper is devoted to showing that an algebraically finitely generated, maximal ideal is surrounded in the maximal ideal space by ideals of the same type and that these ideals form, in a natural way, an analytic variety.
@article {key0159241m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Finitely generated ideals in {B}anach
algebras},
JOURNAL = {J. Math. Mech.},
FJOURNAL = {Journal of Mathematics and Mechanics},
VOLUME = {13},
NUMBER = {1},
YEAR = {1964},
PAGES = {125--132},
DOI = {10.1512/iumj.1964.13.13007},
NOTE = {MR:0159241. Zbl:0117.34105.},
ISSN = {0095-9057},
}
[35] A. M. Gleason :
“Evolution of an active mathematical theory Science
145 : 3631
(July 1964 ),
pp. 451–457 .
article
Abstract
BibTeX
@article {key66129001,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Evolution of an active mathematical
theory},
JOURNAL = {Science},
VOLUME = {145},
NUMBER = {3631},
MONTH = {July},
YEAR = {1964},
PAGES = {451--457},
DOI = {10.1126/science.145.3631.451},
ISSN = {0036-8075},
}
[36]
A. M. Gleason :
“Evolution of an active mathematical theory Science
31
(1964 ),
pp. 451–457 .
article
BibTeX
@article {key72919398,
AUTHOR = {Andrew M. Gleason},
TITLE = {Evolution of an active mathematical
theory},
JOURNAL = {Science},
VOLUME = {31},
YEAR = {1964},
PAGES = {451--457},
DOI = {10.1126/science.145.3631.451},
}
[37] A. M. Gleason :
“The definition of a quadratic form Am. Math. Mon.
73 : 10
(December 1966 ),
pp. 1049–1056 .
Reprinted in Selected papers on algebra (1977)
MR
0207728 Zbl
0144.02003 article
BibTeX
@article {key0207728m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {The definition of a quadratic form},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {73},
NUMBER = {10},
MONTH = {December},
YEAR = {1966},
PAGES = {1049--1056},
DOI = {10.2307/2314635},
NOTE = {Reprinted in \textit{Selected papers
on algebra} (1977). MR:0207728. Zbl:0144.02003.},
ISSN = {0002-9890},
}
[38] A. M. Gleason :
Fundamentals of abstract analysis .
Addison-Wesley Series in Mathematics .
Addison-Wesley (Reading, MA ),
1966 .
A corrected reprint was published in 1991 .
MR
0202509 Zbl
0154.04904 book
BibTeX
@book {key0202509m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Fundamentals of abstract analysis},
SERIES = {Addison-Wesley Series in Mathematics},
PUBLISHER = {Addison-Wesley},
ADDRESS = {Reading, MA},
YEAR = {1966},
PAGES = {xi+404},
NOTE = {A corrected reprint was published in
1991. MR:0202509. Zbl:0154.04904.},
}
[39] A. M. Gleason :
Nim and other oriented-graph games ,
1966 .
63 minute black and white film (Mathematical Association of America). Produced by Richard G. Long and directed by Allan Hinderstein.
misc
BibTeX
@misc {key56876419,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Nim and other oriented-graph games},
HOWPUBLISHED = {63 minute black and white film (Mathematical
Association of America). Produced by
Richard G. Long and directed by Allan
Hinderstein.},
YEAR = {1966},
}
[40] H. S. Bear and A. M. Gleason :
“A global integral representation for abstract harmonic functions J. Math. Mech.
16 : 7
(1967 ),
pp. 639–653 .
MR
0210912 Zbl
0146.37102 article
People
BibTeX
@article {key0210912m,
AUTHOR = {Bear, H. S. and Gleason, A. M.},
TITLE = {A global integral representation for
abstract harmonic functions},
JOURNAL = {J. Math. Mech.},
FJOURNAL = {Journal of Mathematics and Mechanics},
VOLUME = {16},
NUMBER = {7},
YEAR = {1967},
PAGES = {639--653},
DOI = {10.1512/iumj.1967.16.16042},
NOTE = {MR:0210912. Zbl:0146.37102.},
ISSN = {0095-9057},
}
[41] A. M. Gleason :
“A characterization of maximal ideals J. Anal. Math.
19 : 1
(December 1967 ),
pp. 171–172 .
MR
0213878 Zbl
0148.37502 article
BibTeX
@article {key0213878m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {A characterization of maximal ideals},
JOURNAL = {J. Anal. Math.},
FJOURNAL = {Journal d'Analyse Math\'ematique},
VOLUME = {19},
NUMBER = {1},
MONTH = {December},
YEAR = {1967},
PAGES = {171--172},
DOI = {10.1007/BF02788714},
NOTE = {MR:0213878. Zbl:0148.37502.},
ISSN = {0021-7670},
}
[42] A. M. Gleason :
“The evolution of differential topology ”
in
The mathematical sciences .
Edited by G. A. W. Boehm .
MIT Press (Cambridge, MA ),
1969 .
incollection
People
BibTeX
@incollection {key12978711,
AUTHOR = {Gleason, Andrew M.},
TITLE = {The evolution of differential topology},
BOOKTITLE = {The mathematical sciences},
EDITOR = {Boehm, George A. W.},
PUBLISHER = {MIT Press},
ADDRESS = {Cambridge, MA},
YEAR = {1969},
ISBN = {9780262030267},
}
[43] A. M. Gleason :
“Remarks on the van der Waerden permanent conjecture J. Comb. Theory
8 : 1
(January 1970 ),
pp. 54–64 .
MR
0255562 Zbl
0215.05302 article
Abstract
BibTeX
The van der Waerden permanent conjecture is shown to belong to a large family of conjectured inequalities which are of some interest in themselves and all of which might be provable by a routine computation with convex bodies. In fact, the permanent conjecture in cases \( n = 3 \) and 4 does yield to this method. For \( n = 5 \) , with the computations made by hand, no proof was found, but a slight extension of the computation (which would probably require electronic assistance) could still settle this case and perhaps even a few more small values of \( n \) . The question of whether the method must work remains open.
@article {key0255562m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Remarks on the van der {W}aerden permanent
conjecture},
JOURNAL = {J. Comb. Theory},
FJOURNAL = {Journal of Combinatorial Theory},
VOLUME = {8},
NUMBER = {1},
MONTH = {January},
YEAR = {1970},
PAGES = {54--64},
DOI = {10.1016/S0021-9800(70)80008-4},
NOTE = {MR:0255562. Zbl:0215.05302.},
ISSN = {0097-3165},
}
[44] A. M. Gleason :
“Weight polynomials of self-dual codes and the MacWilliams identities 211–215
in
Actes du Congrès International des Mathématiciens, 1970
[Proceedings of the International Congress of Mathematicians, 1970 ]
(Nice, 1–10 September 1970 ),
vol. 3 .
Gauthier-Villars (Paris ),
1971 .
To Marshall Hall, Jr. on his sixtieth birthday.
MR
0424391 Zbl
0287.05010 incollection
Abstract
People
BibTeX
Many error-correcting codes are known to be self-dual. Hence the MacWilliams identities put a considerable restriction on the possible weight distribution of such a code. We show that this restriction, for codes over \( \operatorname{GF}(2) \) and \( \operatorname{GF}(3) \) , is that the weight polynomial must lie in an explicitly described free polynomial ring. To extend these results (in part) to self-dual codes over larger fields, we introduce more general weight polynomials and extend the MacWilliams identities to these.
@incollection {key0424391m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Weight polynomials of self-dual codes
and the {M}ac{W}illiams identities},
BOOKTITLE = {Actes du {C}ongr\`es {I}nternational
des {M}ath\'ematiciens, 1970 [Proceedings
of the {I}nternational {C}ongress of
{M}athematicians, 1970]},
VOLUME = {3},
PUBLISHER = {Gauthier-Villars},
ADDRESS = {Paris},
YEAR = {1971},
PAGES = {211--215},
URL = {http://www.mathunion.org/ICM/ICM1970.3/Main/icm1970.3.0211.0216.ocr.pdf},
NOTE = {(Nice, 1--10 September 1970). To Marshall
Hall, Jr. on his sixtieth birthday.
MR:0424391. Zbl:0287.05010.},
}
[45] A. M. Gleason :
Linear analysis and calculus .
Harvard University lecture notes .
1972–1973 .
book
BibTeX
@book {key63929165,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Linear analysis and calculus},
SERIES = {Harvard University lecture notes},
YEAR = {1972--1973},
}
[46] A. M. Gleason :
“The definition of a quadratic form ”
in
Selected papers on algebra .
Edited by E. F. Beckenbach, S. Montgomery, and E. W. Ralston .
Raymond W. Brink Selected Mathematical Papers 3 .
Mathematical Association of America (Washington, DC ),
1977 .
Reprinted from Am. Math. Mon. 73 :10 (1966)
incollection
People
BibTeX
@incollection {key54801928,
AUTHOR = {Gleason, Andrew M.},
TITLE = {The definition of a quadratic form},
BOOKTITLE = {Selected papers on algebra},
EDITOR = {Beckenbach, Edwin Ford and Montgomery,
Susan and Ralston, Elizabeth W.},
SERIES = {Raymond W. Brink Selected Mathematical
Papers},
NUMBER = {3},
PUBLISHER = {Mathematical Association of America},
ADDRESS = {Washington, DC},
YEAR = {1977},
NOTE = {Reprinted from \textit{Am. Math. Mon.}
\textbf{73}:10 (1966).},
ISBN = {9780883852033},
}
[47] A. M. Gleason :
“A curvature formula Am. J. Math.
101 : 1
(February 1979 ),
pp. 86–93 .
MR
527827 Zbl
0423.53002 article
Abstract
BibTeX
Let \( A \) be a smooth curve of finite length \( L(A) \) . For each \( n \) let \( P_n \) be the longest polygon of not more than \( n \) sides that is inscribed in \( A \) . Then
\[ L(A)-L(P_n) \to 0 ,\]
and the question naturally arises, how fast?
For a circular arc of length \( L \) and radius \( R \) one easily finds that
\[ \lim_{n\to\infty} n^2(L(A)-L(P_n)) = L^3/24R^2. \]
Considering that any smooth arc of finite length can be well approximated by a finite sequence of circular arcs, it seems natural to conjecture that
\[ \lim n^2(L(A)-L(P_n)) \]
always exists and is some sort of integral of the curvature. In this paper we shall prove the following theorem.
Let \( A \) be a curve in euclidean space (possibly of infinite dimension) of class \( C^2 \) and length \( L \) . FOr each positive integer \( n \) , let \( P_n \) be the longest polygon of \( n \) edges properly inscribed in \( A \) . Then
\[ \lim n^2(L-L(P_n)) = \frac{1}{24}\left(\int_A \kappa^{2/3} ds\right)^3. \]
@article {key527827m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {A curvature formula},
JOURNAL = {Am. J. Math.},
FJOURNAL = {American Journal of Mathematics},
VOLUME = {101},
NUMBER = {1},
MONTH = {February},
YEAR = {1979},
PAGES = {86--93},
DOI = {10.2307/2373940},
NOTE = {MR:527827. Zbl:0423.53002.},
ISSN = {0002-9327},
CODEN = {AJMAAN},
}
[48] E. D. Bolker and A. M. Gleason :
“Counting permutations J. Comb. Theory, Ser. A
29 : 2
(September 1980 ),
pp. 236–242 .
MR
583962 Zbl
0439.05003 article
Abstract
People
BibTeX
@article {key583962m,
AUTHOR = {Bolker, Ethan D. and Gleason, Andrew
M.},
TITLE = {Counting permutations},
JOURNAL = {J. Comb. Theory, Ser. A},
FJOURNAL = {Journal of Combinatorial Theory. Series
A},
VOLUME = {29},
NUMBER = {2},
MONTH = {September},
YEAR = {1980},
PAGES = {236--242},
DOI = {10.1016/0097-3165(80)90012-6},
NOTE = {MR:583962. Zbl:0439.05003.},
ISSN = {0097-3165},
CODEN = {JCBTA7},
}
[49] A. M. Gleason, R. E. Greenwood, and L. M. Kelly :
The William Lowell Putnam Mathematical Competition .
Mathematical Association of America (Washington, DC ),
1980 .
Problems and Solutions: 1938–1964.
MR
588757 Zbl
0444.00006 book
People
BibTeX
@book {key588757m,
AUTHOR = {Gleason, A. M. and Greenwood, R. E.
and Kelly, L. M.},
TITLE = {The {W}illiam {L}owell {P}utnam {M}athematical
{C}ompetition},
PUBLISHER = {Mathematical Association of America},
ADDRESS = {Washington, DC},
YEAR = {1980},
PAGES = {xi+652},
NOTE = {Problems and Solutions: 1938--1964.
MR:588757. Zbl:0444.00006.},
ISBN = {9780883854624},
}
[50] A. M. Gleason :
“How does one get so much information from so few assumptions? ,”
pp. 83–89
in
Science, computers, and the information onslaught
(Los Alamos, NM, June 1981 ).
Edited by D. M. Kerr, K. Braithwaite, N. Metropolis, D. H. Sharp, and G.-C. Rota .
Academic Press (Orlando, FL ),
1984 .
MR
763872 incollection
People
BibTeX
@incollection {key763872m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {How does one get so much information
from so few assumptions?},
BOOKTITLE = {Science, computers, and the information
onslaught},
EDITOR = {Kerr, Donald M. and Braithwaite, Karl
and Metropolis, N. and Sharp, David
H. and Rota, Gian-Carlo},
PUBLISHER = {Academic Press},
ADDRESS = {Orlando, FL},
YEAR = {1984},
PAGES = {83--89},
NOTE = {(Los Alamos, NM, June 1981). MR:763872.},
ISBN = {9780124049703},
}
[51] A. M. Gleason, W. F. Penney, and R. E. Wyllys :
Elementary course in probability for the cryptanalyst ,
revised edition.
Cryptographic Series 41 .
Aegean Park Press (Laguna Hills, CA ),
1985 .
Unclassified reprint of a book originally published in 1957 by the National Security Agency, Office of Research and Development, Mathematical Research Division.
book
People
BibTeX
@book {key65919251,
AUTHOR = {Gleason, Andrew M. and Penney, Walter
F. and Wyllys, Ronald E.},
TITLE = {Elementary course in probability for
the cryptanalyst},
EDITION = {revised},
SERIES = {Cryptographic Series},
NUMBER = {41},
PUBLISHER = {Aegean Park Press},
ADDRESS = {Laguna Hills, CA},
YEAR = {1985},
NOTE = {Unclassified reprint of a book originally
published in 1957 by the National Security
Agency, Office of Research and Development,
Mathematical Research Division.},
}
[52]
A. M. Gleason :
Elementary course in probability for the cryptanalyst .
Aegean Park Press (Laguna Hills, CA ),
1985 .
book
BibTeX
@book {key34867049,
AUTHOR = {A. M. Gleason},
TITLE = {Elementary course in probability for
the cryptanalyst},
PUBLISHER = {Aegean Park Press},
ADDRESS = {Laguna Hills, CA},
YEAR = {1985},
}
[53] Proceedings of the International Congress of Mathematicians Berkeley, CA, 3–11 August 1986 ),
vol. 1 and 2 .
Edited by A. M. Gleason .
American Mathematical Society (Providence, RI ),
1987 .
MR
0934208 Zbl
0657.00005 book
BibTeX
@book {key0934208m,
TITLE = {Proceedings of the {I}nternational {C}ongress
of {M}athematicians},
EDITOR = {Gleason, Andrew M.},
VOLUME = {1 and 2},
PUBLISHER = {American Mathematical Society},
ADDRESS = {Providence, RI},
YEAR = {1987},
PAGES = {1850},
URL = {http://www.mathunion.org/ICM/Info/1986.html},
NOTE = {(Berkeley, CA, 3--11 August 1986). MR:0934208.
Zbl:0657.00005.},
ISBN = {9780821801109},
}
[54] A. M. Gleason :
“Angle trisection, the heptagon, and the triskaidecagon Am. Math. Mon.
95 : 3
(1988 ),
pp. 185–194 .
Dedicated to David Vernon Widder on his 90th birthday.
Addenda to this article were published in Am. Math. Mon. 95 :10 (1988)
MR
935432 Zbl
0661.51013 article
People
BibTeX
@article {key935432m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Angle trisection, the heptagon, and
the triskaidecagon},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {95},
NUMBER = {3},
YEAR = {1988},
PAGES = {185--194},
DOI = {10.2307/2323624},
URL = {http://www.jstor.org/stable/2323624},
NOTE = {Dedicated to David Vernon Widder on
his 90th birthday. Addenda to this article
were published in \textit{Am. Math.
Mon.} \textbf{95}:10 (1988). MR:935432.
Zbl:0661.51013.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[55] A. M. Gleason :
“Addenda: ‘Angle trisection, the heptagon, and the triskaidecagon’ Am. Math. Mon.
95 : 10
(December 1988 ),
pp. 911 .
Addenda to an article published in Am. Math. Mon. 95 :3 (1988)
MR
979135 article
BibTeX
@article {key979135m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Addenda: ``{A}ngle trisection, the heptagon,
and the triskaidecagon''},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {95},
NUMBER = {10},
MONTH = {December},
YEAR = {1988},
PAGES = {911},
DOI = {10.2307/2322383},
URL = {http://www.jstor.org/stable/2322383},
NOTE = {Addenda to an article published in \textit{Am.
Math. Mon.} \textbf{95}:3 (1988). MR:979135.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[56] R. H. Bott :
The topological constraints on analysis 1989 .
60 minute videocassette. AMS-MAA Joint Lecture Series. American Mathematical Society (Providence, RI).
Gleason introduces Bott. Recorded in Providence, RI, 9 August 1988.
MR
1057176 Zbl
0925.01018 misc
People
BibTeX
@misc {key1057176m,
AUTHOR = {Bott, Raoul H.},
TITLE = {The topological constraints on analysis},
HOWPUBLISHED = {60 minute videocassette. AMS-MAA Joint
Lecture Series. American Mathematical
Society (Providence, RI)},
YEAR = {1989},
URL = {http://www.ams.org/bookstore-getitem/item=VIDEO-15},
NOTE = {Gleason introduces Bott. Recorded in
Providence, RI, 9 August 1988. MR:1057176.
Zbl:0925.01018.},
ISBN = {9780821880142},
}
[57] R. L. Graham :
Arithmetic progressions: From Hilbert to Shelah 1989 .
55 minute videcassette. AMS-MAA Joint Lecture Series. American Mathematical Society (Providence, RI).
Gleason introduces Graham. Recorded in Phoenix, AZ, 13 January 1989.
MR
1056080 Zbl
0920.05068 misc
People
BibTeX
@misc {key1056080m,
AUTHOR = {Graham, Ronald L.},
TITLE = {Arithmetic progressions: {F}rom {H}ilbert
to {S}helah},
HOWPUBLISHED = {55 minute videcassette. AMS-MAA Joint
Lecture Series. American Mathematical
Society (Providence, RI).},
YEAR = {1989},
URL = {http://www.ams.org/bookstore-getitem/item=VIDEO-31},
NOTE = {Gleason introduces Graham. Recorded
in Phoenix, AZ, 13 January 1989. MR:1056080.
Zbl:0920.05068.},
ISBN = {9780821880258},
}
[58] A. M. Gleason, A. Jaffe, B. Mazur, R. H. Herman, C. H. Clemens, J. Kollár, K. Gawędzki, C. Soulé, and M. Sipser :
“ICM-90 ,”
Notices Am. Math. Soc.
37 : 9
(1990 ),
pp. 1209–1216 .
Report on the International Congress of Mathematicians held in Kyoto, 21–29 August 1990.
MR
1076560 Zbl
1194.01041 article
People
BibTeX
@article {key1076560m,
AUTHOR = {Gleason, Andrew M. and Jaffe, Arthur
and Mazur, Barry and Herman, Richard
H. and Clemens, C. Herbert and Koll\'ar,
J\'anos and Gaw{\polhk{e}}dzki, Krzysztof
and Soul\'e, Christophe and Sipser,
Michael},
TITLE = {I{CM}-90},
JOURNAL = {Notices Am. Math. Soc.},
FJOURNAL = {Notices of the American Mathematical
Society},
VOLUME = {37},
NUMBER = {9},
YEAR = {1990},
PAGES = {1209--1216},
NOTE = {Report on the International Congress
of Mathematicians held in Kyoto, 21--29
August 1990. MR:1076560. Zbl:1194.01041.},
ISSN = {0002-9920},
CODEN = {AMNOAN},
}
[59] “Andrew M. Gleason ”
in
More mathematical people: Contemporary conversations .
Edited by D. J. Albers, G. L. Alexanderson, and C. Reid .
Harcourt Brace Jovanovich (San Diego ),
1990 .
incollection
People
BibTeX
@incollection {key52843404,
TITLE = {Andrew M. Gleason},
BOOKTITLE = {More mathematical people: {C}ontemporary
conversations},
EDITOR = {Albers, Donald J. and Alexanderson,
Gerald L. and Reid, Constance},
PUBLISHER = {Harcourt Brace Jovanovich},
ADDRESS = {San Diego},
YEAR = {1990},
ISBN = {9780151581757},
}
[60] A. M. Gleason :
Fundamentals of abstract analysis ,
corrected reprint edition.
Jones and Bartlett (Boston, MA ),
1991 .
The original edition was published in 1966 .
MR
1140189 Zbl
0773.00001 book
BibTeX
@book {key1140189m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Fundamentals of abstract analysis},
EDITION = {corrected reprint},
PUBLISHER = {Jones and Bartlett},
ADDRESS = {Boston, MA},
YEAR = {1991},
PAGES = {xii+404},
NOTE = {The original edition was published in
1966. MR:1140189. Zbl:0773.00001.},
ISBN = {9780867202090},
}
[61] A. Gleason :
“Semigroups of shift register counting matrices Math. Syst. Theory
25 : 4
(1992 ),
pp. 253–267 .
Revised by Fred Kochman and Lee Neuwirth. From notes by Richard Beals and Michael Spivak.
MR
1166764 Zbl
0790.20086 article
Abstract
People
BibTeX
This is a revised and corrected version of notes from lectures by Andrew Gleason. The goal of the paper is a structure theorem about “onto maps” from the space of infinite Boolean sequences to itself, induced by binary functions on a shift register. The methods of proof involve a close study of the semigroup of counting matrices.
@article {key1166764m,
AUTHOR = {Gleason, Andrew},
TITLE = {Semigroups of shift register counting
matrices},
JOURNAL = {Math. Syst. Theory},
FJOURNAL = {Mathematical Systems Theory},
VOLUME = {25},
NUMBER = {4},
YEAR = {1992},
PAGES = {253--267},
DOI = {10.1007/BF01213859},
NOTE = {Revised by Fred Kochman and Lee Neuwirth.
From notes by Richard Beals and Michael
Spivak. MR:1166764. Zbl:0790.20086.},
ISSN = {0025-5661},
CODEN = {MASTBA},
}
[62] Andrew M. Gleason: Glimpses of a life in mathematics .
Edited by E. Bolker, P. Chernoff, C. Costes, and D. Lieberman .
Privately printed ,
1992 .
book
People
BibTeX
@book {key97833025,
TITLE = {Andrew M. Gleason: Glimpses of a life
in mathematics},
EDITOR = {Ethan Bolker and Paul Chernoff and Constantine
Costes and David Lieberman},
PUBLISHER = {Privately printed},
YEAR = {1992},
}
[63] A. M. Gleason :
“On the maps implicit in the Jordan–Hölder theorem ,”
pp. 95–106
in
Semigroup theory and its applications: Proceedings of the 1994 conference commemorating the work of Alfred H. Clifford
(New Orleans, LA, 28–30 March 1994 ).
Edited by K. H. Hofmann and M. W. Mislove .
London Mathematical Society Lecture Note Series 231 .
Cambridge University Press ,
1996 .
MR
1430815 Zbl
0905.20018 incollection
People
BibTeX
@incollection {key1430815m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {On the maps implicit in the {J}ordan--{H}\"older
theorem},
BOOKTITLE = {Semigroup theory and its applications:
{P}roceedings of the 1994 conference
commemorating the work of {A}lfred {H}.
{C}lifford},
EDITOR = {Hofmann, Karl Heinrich and Mislove,
Michael W.},
SERIES = {London Mathematical Society Lecture
Note Series},
NUMBER = {231},
PUBLISHER = {Cambridge University Press},
YEAR = {1996},
PAGES = {95--106},
NOTE = {(New Orleans, LA, 28--30 March 1994).
MR:1430815. Zbl:0905.20018.},
ISSN = {0076-0052},
ISBN = {9780521576697},
}
[64] H. O. Pollak :
“Yueh-Gin Gung and Dr. Charles Y. Hu Award for Distinguished Service to Andrew Gleason Amer. Math. Mon.
103 : 2
(1996 ),
pp. 105–106 .
MR
1375055 Zbl
0845.01014 article
People
BibTeX
@article {key1375055m,
AUTHOR = {Pollak, H. O.},
TITLE = {Yueh-{G}in {G}ung and {D}r. {C}harles
{Y}. {H}u {A}ward for {D}istinguished
{S}ervice to {A}ndrew {G}leason},
JOURNAL = {Amer. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {103},
NUMBER = {2},
YEAR = {1996},
PAGES = {105--106},
DOI = {10.2307/2975102},
URL = {http://www.jstor.org/stable/2975102},
NOTE = {MR:1375055. Zbl:0845.01014.},
ISSN = {0002-9890},
}
[65] W. G. McCallum, D. Hughes-Hallett, A. M. Gleason, D. Flath, S. P. Gordon, D. Mumford, B. G. Osgood, D. Quinney, W. Raskind, J. Tecosky-Feldman, J. B. Thrash, and T. W. Tucker :
Multivariable calculus .
Wiley (New York ),
1997 .
A later edition was published in 1998 .
Zbl
0892.26002 book
People
BibTeX
@book {key0892.26002z,
AUTHOR = {McCallum, William G. and Hughes-Hallett,
Deborah and Gleason, Andrew M. and Flath,
Daniel and Gordon, Sheldon P. and Mumford,
David and Osgood, Brad G. and Quinney,
Douglas and Raskind, Wayne and Tecosky-Feldman,
Jeff and Thrash, Joe B. and Tucker,
Thomas W.},
TITLE = {Multivariable calculus},
PUBLISHER = {Wiley},
ADDRESS = {New York},
YEAR = {1997},
PAGES = {xv+503},
NOTE = {A later edition was published in 1998.
Zbl:0892.26002.},
ISBN = {9780471311515},
}
[66] D. Hughes-Hallett, A. M. Gleason, W. G. McCallum, D. E. Flath, P. F. Lock, S. P. Gordon, D. O. Lomen, D. Lovelock, D. Mumford, B. G. Osgood, A. Pasquale, D. Quinney, J. Tecosky-Feldman, J. B. Thrash, K. R. Thrash, and T. W. Tucker :
Calculus ,
2nd edition.
Wiley (New York ),
1998 .
A later edition was published in 2013 .
Zbl
0913.26003 book
People
BibTeX
@book {key0913.26003z,
AUTHOR = {Hughes-Hallett, Deborah and Gleason,
Andrew M. and McCallum, William G. and
Flath, Daniel E. and Lock, Patti Frazer
and Gordon, Sheldon P. and Lomen, David
O. and Lovelock, David and Mumford,
David and Osgood, Brad G. and Pasquale,
Andrew and Quinney, Douglas and Tecosky-Feldman,
Jeff and Thrash, Joe B. and Thrash,
Karen R. and Tucker, Thomas W.},
TITLE = {Calculus},
EDITION = {2nd},
PUBLISHER = {Wiley},
ADDRESS = {New York},
YEAR = {1998},
PAGES = {xix+984},
NOTE = {A later edition was published in 2013.
Zbl:0913.26003.},
ISBN = {9780471164425},
}
[67] W. G. McCallum, D. Flath, A. M. Gleason, S. P. Gordon, D. Mumford, B. G. Osgood, D. Hughes-Hallett, D. Quinney, W. Raskind, J. Tecosky-Feldman, J. B. Thrash, and T. W. Tucker :
Multivariable calculus ,
International edition.
Wiley (New York ),
1998 .
With the assistance of Adrian Ioviţă.
An earlier edition was published in 1997 .
Zbl
0913.26004 book
People
BibTeX
@book {key0913.26004z,
AUTHOR = {McCallum, William G. and Flath, Daniel
and Gleason, Andrew M. and Gordon, Sheldon
P. and Mumford, David and Osgood, Brad
G. and Hughes-Hallett, Deborah and Quinney,
Douglas and Raskind, Wayne and Tecosky-Feldman,
Jeff and Thrash, Joe B. and Tucker,
Thomas W.},
TITLE = {Multivariable calculus},
EDITION = {International},
PUBLISHER = {Wiley},
ADDRESS = {New York},
YEAR = {1998},
PAGES = {xv+503},
NOTE = {With the assistance of Adrian Iovi\c
t\u a. An earlier edition was published
in 1997. Zbl:0913.26004.},
ISBN = {9780471194286},
}
[68] D. Hughes-Hallett, A. M. Gleason, D. E. Flath, P. F. Lock, S. P. Gordon, D. O. Lomen, D. Lovelock, W. G. McCallum, D. Quinney, B. G. Osgood, A. Pasquale, J. Tecosky-Feldman, J. B. Thrash, T. W. Tucker, and K. R. Thrash :
Calculus: Single variable ,
2nd edition.
Wiley (New York ),
1998 .
This was reproduced as part of a larger work published in 2013 .
Zbl
0892.26001 book
People
BibTeX
@book {key0892.26001z,
AUTHOR = {Hughes-Hallett, Deborah and Gleason,
Andrew M. and Flath, Daniel E. and Lock,
Patti Frazer and Gordon, Sheldon P.
and Lomen, David O. and Lovelock, David
and McCallum, William G. and Quinney,
Douglas and Osgood, Brad G. and Pasquale,
Andrew and Tecosky-Feldman, Jeff and
Thrash, Joe B. and Tucker, Thomas W.
and Thrash, Karen R.},
TITLE = {Calculus: {S}ingle variable},
EDITION = {2nd},
PUBLISHER = {Wiley},
ADDRESS = {New York},
YEAR = {1998},
PAGES = {xvii+647},
NOTE = {This was reproduced as part of a larger
work published in 2013. Zbl:0892.26001.},
ISBN = {9780471164425},
}
[69] A. M. Gleason :
“Yueh-Gin Gung and Dr. Charles Y. Hu Award for Distinguished Service to Paul R. Halmos Am. Math. Mon.
107 : 3
(March 2000 ),
pp. 193–194 .
MR
1742118 Zbl
0977.01029 article
People
BibTeX
@article {key1742118m,
AUTHOR = {Gleason, Andrew M.},
TITLE = {Yueh-{G}in {G}ung and {D}r. {C}harles
{Y}. {H}u {A}ward for {D}istinguished
{S}ervice to {P}aul {R}. {H}almos},
JOURNAL = {Am. Math. Mon.},
FJOURNAL = {American Mathematical Monthly},
VOLUME = {107},
NUMBER = {3},
MONTH = {March},
YEAR = {2000},
PAGES = {193--194},
DOI = {10.2307/2589312},
URL = {http://www.jstor.org/stable/2589312},
NOTE = {MR:1742118. Zbl:0977.01029.},
ISSN = {0002-9890},
CODEN = {AMMYAE},
}
[70] E. Connally, A. M. Gleason, P. Cheifetz, K. Rhea, C. Swenson, D. Hughes-Hallett, F. Avenoso, A. Pasquale, P. Shure, K. Yoshiwara, and A. Davidian :
Functions modeling change: A preparation for calculus .
John Wiley & Sons (New York ),
2000 .
A student study guide for this textbook was published in 2013 .
Zbl
0945.00001 book
People
BibTeX
@book {key0945.00001z,
AUTHOR = {Connally, Eric and Gleason, Andrew M.
and Cheifetz, Philip and Rhea, Karen
and Swenson, Carl and Hughes-Hallett,
Deborah and Avenoso, Frank and Pasquale,
Andrew and Shure, Pat and Yoshiwara,
Katherine and Davidian, Ann},
TITLE = {Functions modeling change: {A} preparation
for calculus},
PUBLISHER = {John Wiley \& Sons},
ADDRESS = {New York},
YEAR = {2000},
PAGES = {xiv+554},
NOTE = {A student study guide for this textbook
was published in 2013. Zbl:0945.00001.},
ISBN = {9780471170846},
}
[71] W. G. McCallum, E. Connally, and D. Hughes-Hallett :
Algebra: Form and function ,
draft second edition.
Wiley (Hoboken, NJ ),
2007 .
With the assistance of Andrew Gleason.
book
People
BibTeX
@book {key26495264,
AUTHOR = {McCallum, William Gordon and Connally,
Eric and Hughes-Hallett, Deborah},
TITLE = {Algebra: {F}orm and function},
EDITION = {draft second},
PUBLISHER = {Wiley},
ADDRESS = {Hoboken, NJ},
YEAR = {2007},
PAGES = {xii+512},
NOTE = {With the assistance of {A}ndrew {G}leason.},
ISBN = {9780471271758},
}
[72] C. Castello :
“Andrew Gleason: Helped solve vexing geometry problem Boston Globe
(20 October 2008 ).
article
People
BibTeX
@article {key18390029,
AUTHOR = {Castello, Caitlin},
TITLE = {Andrew {G}leason: {H}elped solve vexing
geometry problem},
JOURNAL = {Boston Globe},
MONTH = {20 October},
YEAR = {2008},
URL = {http://www.boston.com/bostonglobe/obituaries/articles/2008/10/20/andrew_gleason_helped_solve_vexing_geometry_problem},
ISSN = {0743-1791},
}
[73] E. D. Bolker, R. Palais, J. B. Gleason, D. Hughes-Hallett, T. C. Stevens, J. Tecosky-Feldman, T. Tucker, P. R. Chernoff, J. J. Spencer, J. Wermer, J. Burroughs, D. Lieberman, J. Reeds, L. Barrett, and L. Dunton-Downer :
“Andrew M. Gleason 1921–2008 Notices Am. Math. Soc.
56 : 10
(November 2009 ),
pp. 1236–1267 .
Bolker was the coordinating editor for this collection of tributes.
MR
2572754 Zbl
1178.01040 article
People
BibTeX
@article {key2572754m,
AUTHOR = {Bolker, Ethan D. and Palais, Richard
and Gleason, Jean Berko and Hughes-Hallett,
Deborah and Stevens, T. Christine and
Tecosky-Feldman, Jeff and Tucker, Thomas
and Chernoff, Paul R. and Spencer, Joel
J. and Wermer, John and Burroughs, John
and Lieberman, David and Reeds, Jim
and Barrett, Lida and Dunton-Downer,
Leslie},
TITLE = {Andrew M. Gleason 1921--2008},
JOURNAL = {Notices Am. Math. Soc.},
FJOURNAL = {Notices of the American Mathematical
Society},
VOLUME = {56},
NUMBER = {10},
MONTH = {November},
YEAR = {2009},
PAGES = {1236--1267},
URL = {http://www.ams.org/notices/200910/rtx091001236p.pdf},
NOTE = {Bolker was the coordinating editor for
this collection of tributes. MR:2572754.
Zbl:1178.01040.},
}
[74] B. Mazur, B. Gross, and D. Mumford :
“Andrew Gleason, 4 November 1921–17 October 2008 Proc. Am. Phil. Soc.
154 : 4
(December 2010 ),
pp. 471–476 .
A slightly expanded version of the obituary published in the Harvard University Gazette (1 April 2010)
article
People
BibTeX
@article {key97733932,
AUTHOR = {Mazur, Barry and Gross, Benedict and
Mumford, David},
TITLE = {Andrew {G}leason, 4 November 1921--17
October 2008},
JOURNAL = {Proc. Am. Phil. Soc.},
FJOURNAL = {Proceedings of the American Philosophical
Society},
VOLUME = {154},
NUMBER = {4},
MONTH = {December},
YEAR = {2010},
PAGES = {471--476},
URL = {http://www.amphilsoc.org/sites/default/files/proceedings/1540408.pdf},
NOTE = {A slightly expanded version of the obituary
published in the \textit{Harvard University
Gazette} (1 April 2010).},
ISSN = {0003-049X},
}
[75] E. Connally, D. Hughes-Hallett, A. M. Gleason, P. Cheifetz, A. Davidian, D. E. Flath, S. Kalayciôuglu, B. Lahme, P. F. Lock, W. G. McCallum, J. Morris, K. R. Rhea, E. Schmierer, P. Shure, A. H. Spiegler, C. Swenson, E. J. Marks, F. Avenoso, D. Quinney, and K. Yoshiwara :
Functions modeling change: A preparation for calculus: Student study guide .
John Wiley & Sons (Hoboken, NJ ),
2013 .
Student study guide for Functions modeling change: A preparation for calculus (2000)
Zbl
pre06189302 book
People
BibTeX
@book {keypre06189302z,
AUTHOR = {Connally, Eric and Hughes-Hallett, Deborah
and Gleason, Andrew M. and Cheifetz,
Philip and Davidian, Ann and Flath,
Daniel E. and Kalayci\^ouglu, Selin
and Lahme, Brigitte and Lock, Patti
Frazer and McCallum, William G. and
Morris, Jerry and Rhea, Karen R. and
Schmierer, Ellen and Shure, Pat and
Spiegler, Adam H. and Swenson, Carl
and Marks, Elliot J. and Avenoso, Frank
and Quinney, Douglas and Yoshiwara,
Katherine},
TITLE = {Functions modeling change: {A} preparation
for calculus: {S}tudent study guide},
PUBLISHER = {John Wiley \& Sons},
ADDRESS = {Hoboken, NJ},
YEAR = {2013},
NOTE = {Student study guide for \textit{Functions
modeling change: A preparation for calculus}
(2000). Zbl:pre06189302.},
ISBN = {9781118104989},
}
[76] W. G. McCallum, D. Hughes-Hallett, A. M. Gleason, S. Kalayciôglu, B. Lahme, P. F. Lock, G. I. Lozano, J. Morris, D. Mumford, B. G. Osgood, C. L. Patterson, D. Quinney, A. H. Spiegler, J. Tecosky-Feldman, and T. W. Tucker :
Calculus ,
6th, revised edition.
Wiley (New York, NY ),
2013 .
International student edition.
Earlier editions were published in 1998 and, under a different title, in 1997 and 1998 .
Zbl
1266.26002 book
People
BibTeX
@book {key1266.26002z,
AUTHOR = {McCallum, William G. and Hughes-Hallett,
Deborah and Gleason, Andrew M. and Kalayci\^oglu,
Selin and Lahme, Brigitte and Lock,
Patti Frazer and Lozano, Guadalupe I.
and Morris, Jerry and Mumford, David
and Osgood, Brad G. and Patterson, Cody
L. and Quinney, Douglas and Spiegler,
Adam H. and Tecosky-Feldman, Jeff and
Tucker, Thomas W.},
TITLE = {Calculus},
EDITION = {6th, revised},
PUBLISHER = {Wiley},
ADDRESS = {New York, NY},
YEAR = {2013},
PAGES = {520},
NOTE = {International student edition. Earlier
editions were published in 1998 and,
under a different title, in 1997 and
1998. Zbl:1266.26002.},
ISBN = {9781118572160},
}
