PREFACE ix
ACKNOWLEDGMENTS xvii
NOTATION USED IN THE TEXT xix
A SKETCH OF THE HISTORY OF ALGEBRA TO 1929 xxiii
0 Preliminaries 1
0.1 Proofs / 1
0.2 Sets / 5
0.3 Mappings / 9
0.4 Equivalences / 17
1 Integers and Permutations 23
1.1 Induction / 24
1.2 Divisors and Prime Factorization / 32
1.3 Integers Modulo n / 42
1.4 Permutations / 53
1.5 An Application to Cryptography / 67
2 Groups 69
2.1 Binary Operations / 70
2.2 Groups / 76
2.3 Subgroups / 86
2.4 Cyclic Groups and the Order of an Element / 90
2.5 Homomorphisms and Isomorphisms / 99
2.6 Cosets and Lagrange’s Theorem / 108
2.7 Groups of Motions and Symmetries / 117
2.8 Normal Subgroups / 122
2.9 Factor Groups / 131
2.10 The Isomorphism Theorem / 137
2.11 An Application to Binary Linear Codes / 143
3 Rings 159
3.1 Examples and Basic Properties / 160
3.2 Integral Domains and Fields / 171
3.3 Ideals and Factor Rings / 180
3.4 Homomorphisms / 189
3.5 Ordered Integral Domains / 199
4 Polynomials 202
4.1 Polynomials / 203
4.2 Factorization of Polynomials Over a Field / 214
4.3 Factor Rings of Polynomials Over a Field / 227
4.4 Partial Fractions / 236
4.5 Symmetric Polynomials / 239
4.6 Formal Construction of Polynomials / 248
5 Factorization in Integral Domains 251
5.1 Irreducibles and Unique Factorization / 252
5.2 Principal Ideal Domains / 264
6 Fields 274
6.1 Vector Spaces / 275
6.2 Algebraic Extensions / 283
6.3 Splitting Fields / 291
6.4 Finite Fields / 298
6.5 Geometric Constructions / 304
6.6 The Fundamental Theorem of Algebra / 308
6.7 An Application to Cyclic and BCH Codes / 310
7 Modules over Principal Ideal Domains 324
7.1 Modules / 324
7.2 Modules Over a PID / 335
8 p-Groups and the Sylow Theorems 349
8.1 Products and Factors / 350
8.2 Cauchy’s Theorem / 357
8.3 Group Actions / 364
8.4 The Sylow Theorems / 371
8.5 Semidirect Products / 379
8.6 An Application to Combinatorics / 382
9 Series of Subgroups 388
9.1 The Jordan–H¨older Theorem / 389
9.2 Solvable Groups / 395
9.3 Nilpotent Groups / 401
10 Galois Theory 412
10.1 Galois Groups and Separability / 413
10.2 The Main Theorem of Galois Theory / 422
10.3 Insolvability of Polynomials / 434
10.4 Cyclotomic Polynomials and Wedderburn’s Theorem / 442
11 Finiteness Conditions for Rings and Modules 447
11.1 Wedderburn’s Theorem / 448
11.2 The Wedderburn–Artin Theorem / 457
Appendices 471
Appendix A Complex Numbers / 471
Appendix B Matrix Algebra / 478
Appendix C Zorn’s Lemma / 486
Appendix D Proof of the Recursion Theorem / 490
BIBLIOGRAPHY 492
SELECTED ANSWERS 495
INDEX 523
W. KEITH NICHOLSON, PhD, is Professor in the Department of Mathematics and Statistics at the University of Calgary, Canada. He has published extensively in his areas of research interest, which include clean rings, morphic rings and modules, and quasi-morphic rings. Dr. Nicholson is the coauthor of Modern Algebra with Applications, Second Edition, also published by Wiley.
This could also be an excellent adjunct to moretheoretically oriented textbooks used in more intensivecourses. (Computing Reviews, 5 November2012)
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