Presents an accessible avenue to the major theorems of modern algebra
Each chapter can be easily adapted to create a one-semester course
Written in a lively, engaging style
This book presents a graduate-level course on modern algebra. It can be used as a teaching book β owing to the copious exercises β and as a source book for those who wish to use the major theorems of algebra.
The course begins with the basic combinatorial principles of algebra: posets, chain conditions, Galois connections, and dependence theories. Here, the general JordanβHolder Theorem becomes a theorem on interval measures of certain lower semilattices. This is followed by basic courses on groups, rings and modules; the arithmetic of integral domains; fields; the categorical point of view; and tensor products.
Beginning with introductory concepts and examples, each chapter proceeds gradually towards its more complex theorems. Proofs progress step-by-step from first principles. Many interesting results reside in the exercises, for example, the proof that idealsΒ in a Dedekind domain are generated by at most two elements. The emphasis throughout is on real understanding as opposed to memorizing a catechism and so some chapters offer curiosity-driven appendices for the self-motivated student.
Topics
Associative Rings and Algebras
Group Theory and Generalizations
Field Theory and Polynomials
Algebra
