Added chapter sections for table of contents.
Author(s): Thomas W. Hungerford
Series: Graduate Texts in Mathematics 73
Edition: 1
Publisher: Springer-Verlag New York
Year: 1980
Language: English
Pages: 504\528
Tags: Algebra
Cover 1
Title 3
Copyrigth Page 6
Preface to the Springer Edition 9
Preface 11
Acknowledgments 15
Suggestions on the Use of this Book 17
Table of Contents 23
Introduction: Prerequisites and Preliminaries 27
1. Logic 27
2. Sets and Classes 27
3. Functions 29
4. Relations and Partitions 32
5. Products 33
6. The Integers 35
7. The Axiom of Choice, Order and Zorn's Lemma 38
8. Cardinal Numbers 41
Chapter I: Groups 49
1. Semigroups, Monoids and Groups 50
2. Homomorphisms and Subgroups 56
3. Cyclic Groups 61
4. Cosets and Counting 63
5. Normality, Quotient Groups, and Homomorphisms 67
6. Symmetric, Alternating, and Dihedral Groups 72
7. Categories: Products, Coproducts, and Free Objects 78
8. Direct Products and Direct Sums 85
9. Free Groups, Free Products, and Generators and Relations 90
Chapter Ⅱ: The Structure of Groups 96
1. Free Abelian Groups 96
2. Finitely Generated Abelian Groups 102
3. The Krull-Schmidt Theorem 109
4. The Action of a Group on a Set 114
5. The Sylow Theorems 118
6. Classification of Finite Groups 122
7. Nilpotent and Solvable Groups 126
8. Normal and Subnormal Series 133
Chapter Ⅲ: Rings 140
1. Rings and Homomorphisms 141
2. Ideals 148
3. Factorization in Commutative Rings 161
4. Rings of Quotients and Localization 168
5. Rings of Polynomials and Formal Power Series 175
6. Factorization in Polynomial Rings 183
Chapter IV: Modules 194
1. Modules, Homomorphisms and Exact Sequences 195
2. Free Modules and Vector Spaces 206
3. Projective and lnjective Modules 216
4. Hom and Duality 225
5. Tensor Products 233
6. Modules over a Principal Ideal Domain 244
7. Algebras 252
Chapter V: Fields and Galois Theory 256
1. Field Extensions 257
Appendix: Ruler and Compass Constructions 264
2. The Fundamental Theorem 269
Appendix: Symmetric Rational Functions 278
3. Splitting Fields, Algebraic Closure and Normality 283
Appendix: The Fundamental Theorem of Algebra 291
4. The Galois Group of a Polynomial 295
5. Finite Fields 304
6. Separability 308
7. Cyclic Extensions 315
8. Cyclotomic Extensions 323
9. Radical Extensions 328
Appendix: The General Equation of Degree n 333
Chapter Ⅵ: The Structure of Fields 337
1. Transcendence Bases 337
2. Linear Disjointness and Separability 344
Chapter Ⅶ: Linear Algebra 353
1.Matrices and Maps 354
2. Rank and Equivalence 361
Appendix: Abelian Groups Defined by Generators and Relations 369
3. Determinants 374
4. Decomposition of a Single Linear Transformation and Similarity 381
5. The Characteristic Polynomial, Eigenvectors and Eigenvalues 392
Chapter Ⅷ: Commutative Rings and Modules 397
1. Chain Conditions 398
2. Prime and Primary Ideals 403
3. Primary Decomposition 409
4. Noetherian Rings and Modules 413
5. Ring Extensions 420
6. Dedekind Domains 426
7. The Hilbert Nullstellensatz 435
Chapter IX: The Structure of Rings 440
1. Simple and Primitive Rings 441
2. The Jacobson Radical 450
3. Semisimple Rings 460
4. The Prime Radical; Prime and Semiprime Rings 470
5. Algebras 476
6. Division Algebras 482
Chapter X: Categories 490
1. Functors and Natural Transformations 491
2. Adjoint Functors 502
3. Morphisms 506
List of Symbols 511
Bibliography 515
Index 519