This book focuses on homological aspects of equivariant modules. It presents a new homological approximation theory in the category of equivariant modules, unifying the Cohen-Macaulay approximations in commutative ring theory and Ringel's theory of delta-good approximations for quasi-hereditary algebras and reductive groups. The book provides a detailed introduction to homological algebra, commutative ring theory and homological theory of comodules of co-algebras over an arbitrary base. It aims to overcome the difficulty of generalising known homological results in representation theory. This…mehr
This book focuses on homological aspects of equivariant modules. It presents a new homological approximation theory in the category of equivariant modules, unifying the Cohen-Macaulay approximations in commutative ring theory and Ringel's theory of delta-good approximations for quasi-hereditary algebras and reductive groups. The book provides a detailed introduction to homological algebra, commutative ring theory and homological theory of comodules of co-algebras over an arbitrary base. It aims to overcome the difficulty of generalising known homological results in representation theory. This book will be of interest to researchers and graduate students in algebra, specialising in commutative ring theory and representation theory.
Introduction Conventions and terminology Part I. Background Materials: 1. From homological algebra 2. From Commutative ring theory 3. Hopf algebras over an arbitrary base 4. From representation theory 5. Basics on equivariant modules Part II. Equivariant Modules: 1. Homological aspects of (G, A)-modules 2. Matijevic-Roberts type theorem Part III. Highest Weight Theory: 1. Highest weight theory over a field 2. Donkin systems 3. Ringel's theory over a field 4. Ringel's theory over a commutative ring Part IV. Approximations of Equivariant Modules 1. Approximations of (G, A)-modules 2. An application to determinantal rings Bibliography Index Glossary.
Introduction Conventions and terminology Part I. Background Materials: 1. From homological algebra 2. From Commutative ring theory 3. Hopf algebras over an arbitrary base 4. From representation theory 5. Basics on equivariant modules Part II. Equivariant Modules: 1. Homological aspects of (G, A)-modules 2. Matijevic-Roberts type theorem Part III. Highest Weight Theory: 1. Highest weight theory over a field 2. Donkin systems 3. Ringel's theory over a field 4. Ringel's theory over a commutative ring Part IV. Approximations of Equivariant Modules 1. Approximations of (G, A)-modules 2. An application to determinantal rings Bibliography Index Glossary.
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