Overview
The theory of finitely generated abelian groups is introduced in an understandable and concrete way
The analogous theory of similarity of square matrices over a field, including the Jordan form, is explained step by step
Manipulative techniques are stressed to get students ‘on board’
Includes supplementary material: sn.pub/extras
Part of the book series: Springer Undergraduate Mathematics Series (SUMS)
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Table of contents (6 chapters)
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Finitely generated abelian groups
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Similarity of square matrices over a field
Keywords
About this book
At first sight, finitely generated abelian groups and canonical forms of matrices appear to have little in common. However, reduction to Smith normal form, named after its originator H.J.S.Smith in 1861, is a matrix version of the Euclidean algorithm and is exactly what the theory requires in both cases. Starting with matrices over the integers, Part 1 of this book provides a measured introduction to such groups: two finitely generated abelian groups are isomorphic if and only if their invariant factor sequences are identical. The analogous theory of matrix similarity over a field is then developed in Part 2 starting with matrices having polynomial entries: two matrices over a field are similar if and only if their rational canonical forms are equal. Under certain conditions each matrix is similar to a diagonal or nearly diagonal matrix, namely its Jordan form.
The reader is assumed to be familiar with the elementary properties of rings and fields. Also a knowledge of abstract linear algebra including vector spaces, linear mappings, matrices, bases and dimension is essential, although much of the theory is covered in the text but from a more general standpoint: the role of vector spaces is widened to modules over commutative rings.
Based on a lecture course taught by the author for nearly thirty years, the book emphasises algorithmic techniques and features numerous worked examples and exercises with solutions. The early chapters form an ideal second course in algebra for second and third year undergraduates. The later chapters, which cover closely related topics, e.g. field extensions, endomorphism rings, automorphism groups, and variants of the canonical forms, will appeal to more advanced students. The book is a bridge between linear and abstract algebra.
Reviews
From the reviews:
“‘Designed to be a second course in linear algebra suitable for second/third mathematics undergraduates, or postgraduates’, will help the readers to improve their knowledge of basic notions in algebra, as the structure of finitely generated Abelian groups or canonical forms of square matrices. The book contains detailed proofs, illuminating examples, and many exercises which will help the reader to understand very well the presented techniques. … will help the reader to pass from linear to abstract algebra, so I recommend it to all undergraduate students.” (Simion Sorin Breaz, Zentralblatt MATH, Vol. 1242, 2012)
Authors and Affiliations
Bibliographic Information
Book Title: Finitely Generated Abelian Groups and Similarity of Matrices over a Field
Authors: Christopher Norman
Series Title: Springer Undergraduate Mathematics Series
DOI: https://doi.org/10.1007/978-1-4471-2730-7
Publisher: Springer London
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer-Verlag London Limited 2012
Softcover ISBN: 978-1-4471-2729-1Published: 26 January 2012
eBook ISBN: 978-1-4471-2730-7Published: 25 January 2012
Series ISSN: 1615-2085
Series E-ISSN: 2197-4144
Edition Number: 1
Number of Pages: XII, 381
Topics: Field Theory and Polynomials, Group Theory and Generalizations, Linear and Multilinear Algebras, Matrix Theory, Algorithms