Abelian Groups

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Written by one of the subject’s foremost experts, this book focuses on the central developments and modern methods of the advanced theory of abelian groups, while remaining accessible, as an introduction and reference, to the non-specialist. It provides a coherent source for results scattered throughout the research literature with lots of new proofs.

The presentation highlights major trends that have radically changed the modern character of the subject, in particular, the use of homological methods in the structure theory of various classes of abelian groups, and the use of advanced set-theoretical methods in the study of un decidability problems. The treatment of the latter trend includes Shelah’s seminal work on the un decidability in ZFC of Whitehead’s Problem; while the treatment of the former trend includes an extensive (but non-exhaustive) study of p-groups, torsion-free groups, mixed groups and important classes of groups arising from ring theory. To prepare the reader to tackle these topics, the book reviews the fundamentals of abelian group theory and provides some background material from category theory, set theory, topology and homological algebra.

An abundance of exercises are included to test the reader’s comprehension, and to explore noteworthy extensions and related sidelines of the main topics. A list of open problems and questions, in each chapter, invite the reader to take an active part in the subject’s further development.

Author(s): László Fuchs (auth.)
Series: Springer Monographs in Mathematics
Edition: 1
Publisher: Springer International Publishing
Year: 2015

Language: English
Pages: XXI, 747
Tags: Group Theory and Generalizations; Commutative Rings and Algebras; Category Theory, Homological Algebra

Front Matter....Pages i-xxi
Fundamentals....Pages 1-41
Direct Sums and Direct Products....Pages 43-74
Direct Sums of Cyclic Groups....Pages 75-129
Divisibility and Injectivity....Pages 131-148
Purity and Basic Subgroups....Pages 149-181
Algebraically Compact Groups....Pages 183-212
Homomorphism Groups....Pages 213-228
Tensor and Torsion Products....Pages 229-253
Groups of Extensions and Cotorsion Groups....Pages 255-298
Torsion Groups....Pages 299-342
p-Groups with Elements of Infinite Height....Pages 343-408
Torsion-Free Groups....Pages 409-479
Torsion-Free Groups of Infinite Rank....Pages 481-528
Butler Groups....Pages 529-572
Mixed Groups....Pages 573-612
Endomorphism Rings....Pages 613-653
Automorphism Groups....Pages 655-671
Groups in Rings and in Fields....Pages 673-706
Back Matter....Pages 707-747