Elements of the representation theory of associative algebras : volume 1- techniques of representation theory

By: Ibrahim AssemContributor(s): Andrzej Skowronski | Daniel SimsonMaterial type: TextTextSeries: London Mathematical Society Student Texts ; 65Publication details: Cambridge, U.K.: Cambridge University Press, [c2006]Description: 458 pISBN: 9780521586313Subject(s): MathematicsLOC classification: QA251.5
Contents:
0 - Introduction I - Algebras and modules II - Quivers and algebras III - Representations and modules IV - Auslander–Reiten theory V - Nakayama algebras and representation–finite group algebras VI - Tilting theory VII - Representation–finite hereditary algebras VIII - Tilted algebras IX - Directing modules and postprojective components
Summary: This first part of a two-volume set offers a modern account of the representation theory of finite dimensional associative algebras over an algebraically closed field. The authors present this topic from the perspective of linear representations of finite-oriented graphs (quivers) and homological algebra. The self-contained treatment constitutes an elementary, up-to-date introduction to the subject using, on the one hand, quiver-theoretical techniques and, on the other, tilting theory and integral quadratic forms. Key features include many illustrative examples, plus a large number of end-of-chapter exercises. The detailed proofs make this work suitable both for courses and seminars, and for self-study. The volume will be of great interest to graduate students beginning research in the representation theory of algebras and to mathematicians from other fields. --- summary provided by publisher
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Item type Current library Collection Shelving location Call number Status Notes Date due Barcode Item holds
Book Book ICTS
Mathematic Rack No 5 QA251.5 (Browse shelf (Opens below)) Available Invoice no. IN 66 ; Date 08-04-2019 01984
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0 - Introduction
I - Algebras and modules
II - Quivers and algebras
III - Representations and modules
IV - Auslander–Reiten theory
V - Nakayama algebras and representation–finite group algebras
VI - Tilting theory
VII - Representation–finite hereditary algebras
VIII - Tilted algebras
IX - Directing modules and postprojective components

This first part of a two-volume set offers a modern account of the representation theory of finite dimensional associative algebras over an algebraically closed field. The authors present this topic from the perspective of linear representations of finite-oriented graphs (quivers) and homological algebra. The self-contained treatment constitutes an elementary, up-to-date introduction to the subject using, on the one hand, quiver-theoretical techniques and, on the other, tilting theory and integral quadratic forms. Key features include many illustrative examples, plus a large number of end-of-chapter exercises. The detailed proofs make this work suitable both for courses and seminars, and for self-study. The volume will be of great interest to graduate students beginning research in the representation theory of algebras and to mathematicians from other fields. --- summary provided by publisher

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