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"From the reviews: ""A well-written, very thorough account ...Among the topics are lattices, reduction, Minkowskis Theorem, distance functions, packings, and automorphs; some applications to number theory; excellent bibliographical references."" The American Mathematical Monthly"

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9783540023975

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Reviews

"From the reviews: ""The work is carefully written. It is well motivated, and interesting to read, even if it is not always easy... historical material is included... the author has written excellent account of an interesting subject."" -Mathematical Gazette ""A well-written, very thorough account ... Among the topi are lattices, reduction, Minkowskis Theorem, distance functions, packings, and automorphs; some applications to number theory; excellent bibliographical references."" -The American Mathematical Monthly ""It is very clearly written, and assumes little in the way of prerequisites. In particular, it is accessible to an undergraduate who is willing to work a bit, and I speak from experience as I first read the book the summer before I started graduate school. At the same time, it is a serious work giving an exhaustive (and not at all watered down) account of Minkowski's theory. ... This book certainly earns its place in a series on the 'Classics in Mathematics.'"" (Darren Glass, The Mathematical Association of America, January, 2011)"

From the reviews: The work is carefully written. It is well motivated, and interesting to read, even if it is not always easy... historical material is included... the author has written excellent account of an interesting subject. -Mathematical Gazette A well-written, very thorough account ... Among the topi are lattices, reduction, Minkowskis Theorem, distance functions, packings, and automorphs; some applications to number theory; excellent bibliographical references. -The American Mathematical Monthly It is very clearly written, and assumes little in the way of prerequisites. In particular, it is accessible to an undergraduate who is willing to work a bit, and I speak from experience as I first read the book the summer before I started graduate school. At the same time, it is a serious work giving an exhaustive (and not at all watered down) account of Minkowski's theory. ... This book certainly earns its place in a series on the 'Classics in Mathematics.' (Darren Glass, The Mathematical Association of America, January, 2011)

Author Information

"Biography of J.W.S. Cassels J. W. S. Cassels (known to his friends by the Gaelic form ""Ian"" of his first name) was born of mixed English-Scottish parentage on 11 July 1922 in the picturesque cathedral city of Durham. With a first degree from Edinburgh, he commenced research in Cambridge in 1946 under L. J. Mordell, who had just succeeded G. H. Hardy in the Sadleirian Chair of Pure Mathematics. He obtained his doctorate and was elected a Fellow of Trinity College in 1949. After a year in Manchester, he returned to Cambridge and in 1967 became Sadleirian Professor. He was Head of the Department of Pure Mathematics and Mathematical Statistics from 1969 until he retired in 1984. Cassels has contributed to several areas of number theory and written a number of other expository books: - An introduction to diophantine approximations - Rational quadratic forms - Economics for mathematicians - Local fields - Lectures on elliptic curves - Prolegomena to a middlebrow arithmetic of curves of genus 2 (with E. V. Flynn)."

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