| William A. Adkins, Steven Weintraub - Mathematics - 1992 - 526 pages
This book is designed as a text for a first-year graduate algebra course. The choice of topics is guided by the underlying theme of modules as a basic unifying concept in ... | |
| Dan Saracino - Mathematics - 1980 - 233 pages
This text includes an unusually large number of examples, in order to help clarify the concepts of abstract algebra. | |
| Donald S. Passman - Mathematics - 2013 - 160 pages
This volume by a prominent authority on permutation groups consists of lecture notes that provide a self-contained account of distinct classification theorems. A ready source ... | |
| Nathan Jacobson - Mathematics - 2009 - 499 pages
"Explores all of the topics typically covered in undergraduate courses including the rudiments of set theory, group theory, rings, modules, Galois theory, polynomials, linear ... | |
| J.L. Alperin, Rowen B. Bell - Mathematics - 2012 - 196 pages
A concise treatment of topics from group theory and representation theory for use in a one-term course. Focussing on the non-commutative side of the field, this advanced ... | |
| Mathematics - 2008 - 344 pages
Taking a slightly different approach from similar texts, Introduction to Abstract Algebra presents abstract algebra as the main tool underlying discrete mathematics and the ... | |
| Thomas Scott Blyth, E. F. Robertson - Algebra - 1984 - 305 pages
Problem-solving is an art central to understanding and ability in mathematics. With this series of books, the authors have provided a selection of worked examples, problems ... | |
| John A. Beachy - Mathematics - 1999 - 238 pages
A first-year graduate text or reference for advanced undergraduates on noncommutative aspects of rings and modules. | |
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