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By Subject > Science and Mathematics > Mathematics > Algebra
Recommendations...
 Modern Algebra
by Seth Warner
Standard text provides an exceptionally comprehensive treatment of every aspect of modern algebra. Explores algebraic structures, rings and fields, vector spaces, polynomials, linear operators, much more. Over 1,300 exercises. 1965 edition.
all books in Algebra
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| |  Fundamental Concepts of Algebra
by Bruce E. Meserve
Presents the fundamental concepts of algebra illustrated by numerous examples, and in many cases, suitable sequences of exercises — without solutions. Preface. Index. Bibliography. 39 figures.
all books in Algebra
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 Linear Algebra
by Georgi E. Shilov
Covers determinants, linear spaces, systems of linear equations, linear functions of a vector argument, coordinate transformations, the canonical form of the matrix of a linear operator, bilinear and quadratic forms, and more.
all books in Algebra
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 Challenging Problems in Algebra
by Alfred S. Posamentier, Charles T. Salkind
Over 300 unusual problems, ranging from easy to difficult, involving equations and inequalities, Diophantine equations, number theory, quadratic equations, logarithms, more. Detailed solutions, as well as brief answers, for all problems are provided.
all books in General and Popular Mathematics
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| |  Algebra
by Larry C. Grove
This graduate-level text is intended for initial courses in algebra that proceed at a faster pace than undergraduate-level courses. Subjects include groups, rings, fields and Galois theory. 1983 edition. Includes 11 figures. Appendix. References. Index.
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| |  Abstract Algebra
by W. E. Deskins
Excellent textbook provides undergraduates with an accessible introduction to the basic concepts of abstract algebra and to the analysis of abstract algebraic systems. Features many examples and problems.
all books in Algebra
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 Lectures on Linear Algebra
by I. M. Gel’fand
Prominent Russian mathematician's concise, well-written exposition considers: n-dimensional spaces, linear and bilinear forms, linear transformations, canonical form of an arbitrary linear transformation, introduction to tensors, more. 1961 edition.
all books in Algebra
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| |  Elements of Abstract Algebra
by Allan Clark
Lucid coverage of the major theories of abstract algebra, with helpful illustrations and exercises included throughout. Unabridged, corrected republication of the work originally published 1971. Bibliography. Index. Includes 24 tables and figures.
all books in Algebra
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| Products in Algebra | | | | Abstract Algebra
by W. E. Deskins
Excellent textbook provides undergraduates with an accessible introduction to the basic concepts of abstract algebra and to the analysis of abstract algebraic systems. Features many examples and problems.
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|  | Abstract Lie Algebras
by David J Winter
Solid but concise, this account emphasizes Lie algebra's simplicity of theory, offering new approaches to major theorems and extensive treatment of Cartan and related Lie subalgebras over arbitrary fields. 1972 edition.
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| | Algebra
by Larry C. Grove
This graduate-level text is intended for initial courses in algebra that proceed at a faster pace than undergraduate-level courses. Subjects include groups, rings, fields and Galois theory. 1983 edition. Includes 11 figures. Appendix. References. Index.
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|  | The Algebra of Logic
by Louis Couturat
In an admirably succinct form, this volume offers a historical view of the development of the calculus of logic, illustrating its beauty, symmetry, and simplicity from an algebraic perspective. 1914 ed.
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| |  | Algebraic Theories
by Leonard Dickson
This in-depth introduction to classical topics in higher algebra provides rigorous, detailed proofs for its explorations of some of mathematics' most significant concepts, including matrices, invariants, and groups. 1926 edition.
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| |  | Basic Algebra I: Second Edition
by Nathan Jacobson
A classic text and standard reference for a generation, this volume covers all undergraduate algebra topics, including groups, rings, modules, Galois theory, polynomials, linear algebra, and associative algebra. 1985 edition.
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|  | Boolean Algebra
by R. L. Goodstein
This elementary treatment by a distinguished mathematician employs Boolean algebra as a simple medium for introducing important concepts of modern algebra. Numerous examples appear throughout the text, plus full solutions.
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|  | Elementary Matrix Algebra
by Franz E. Hohn
This treatment starts with basics and progresses to sweepout process for obtaining complete solution of any given system of linear equations and role of matrix algebra in presentation of useful geometric ideas, techniques, and terminology.
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| | Elements of Abstract Algebra
by Allan Clark
Lucid coverage of the major theories of abstract algebra, with helpful illustrations and exercises included throughout. Unabridged, corrected republication of the work originally published 1971. Bibliography. Index. Includes 24 tables and figures.
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|  | Foundations of Galois Theory
by M. M. Postnikov
A virtually self-contained treatment of the basics of Galois theory. This 2-part approach begins with the elements of Galois theory and concludes with the unsolvability by radicals of the general equation of degree n > 5.
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| | Fundamental Concepts of Algebra
by Bruce E. Meserve
Presents the fundamental concepts of algebra illustrated by numerous examples, and in many cases, suitable sequences of exercises — without solutions. Preface. Index. Bibliography. 39 figures.
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|  | Introduction to Field Theory: Second Edition
by Iain T. Adamson
This undergraduate text ranges from basics to important results, including properties of rings and fields, extension fields, and Galois theory. "An excellent introduction." — American Mathematical Monthly. 1982 edition.
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|  | Introduction to Higher Algebra
by Maxime Bocher
Brief yet comprehensive, this well-known text by an influential teacher offers an unsurpassed presentation of the fundamentals of higher algebra—polynomials, determinants, matrices, and elimination theory—that provides students with a thorough foundation in algebraic principles. 1907 edition.
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| | | Lectures on Linear Algebra
by I. M. Gel’fand
Prominent Russian mathematician's concise, well-written exposition considers: n-dimensional spaces, linear and bilinear forms, linear transformations, canonical form of an arbitrary linear transformation, introduction to tensors, more. 1961 edition.
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|  | Lie Algebras
by Nathan Jacobson
Definitive treatment of important subject in modern mathematics. Covers split semi-simple Lie algebras, universal enveloping algebras, classification of irreducible modules, automorphisms, simple Lie algebras over an arbitrary field, etc. Index.
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| | Linear Algebra
by Georgi E. Shilov
Covers determinants, linear spaces, systems of linear equations, linear functions of a vector argument, coordinate transformations, the canonical form of the matrix of a linear operator, bilinear and quadratic forms, and more.
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