Modular Representation Theory of Finite Groups

Peter Schneider

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Modular Representation Theory of Finite Groups

by Peter Schneider

Nov 20, 2012

Springer

188

9781447148319

1447148312

Description

<p>Representation theory studies maps from groups into the general linear group of a finite-dimensional vector space. For finite groups the theory comes in two distinct flavours. In the 'semisimple case' (for example over the field of complex numbers) one can use character theory to completely understand the representations. This by far is not sufficient when the characteristic of the field divides the order of the group.</p><p>Modular representation theory of finite groups comprises this second situation. Many additional tools are needed for this case. To mention some, there is the systematic use of Grothendieck groups leading to the Cartan matrix and the decomposition matrix of the group as well as Green's direct analysis of indecomposable representations. There is also the strategy of writing the category of all representations as the direct product of certain subcategories, the so-called 'blocks' of the group.^ Brauer's work then establishes correspondences between the blocks of the original group and blocks of certain subgroups the philosophy being that one is thereby reduced to a simpler situation. In particular, one can measure how nonsemisimple a category a block is by the size and structure of its so-called 'defect group'. All these concepts are made explicit for the example of the special linear group of two-by-two matrices over a finite prime field.</p><p>Although the presentation is strongly biased towards the module theoretic point of view an attempt is made to strike a certain balance by also showing the reader the group theoretic approach. In particular, in the case of defect groups a detailed proof of the equivalence of the two approaches is given. </p><p>This book aims to familiarize students at the masters level with the basic results, tools, and techniques of a beautiful and important algebraic theory.^ Some basic algebra together with the semisimple case are assumed to be known, although all facts to be used are restated (without proofs) in the text. Otherwise the book is entirely self-contained.</p>

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This edition of Modular Representation Theory of Finite Groups has approximately 188 pages. Please note, this is an estimate and the exact page count can vary between hardcover, paperback, and e-book versions.

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For most readers, Modular Representation Theory of Finite Groups typically takes between 3h 55m and 2h 37m to complete. This is based on the book's length of approximately 47,000 words and common reading speeds.

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What is the word count of Modular Representation Theory of Finite Groups?

The estimated word count for Modular Representation Theory of Finite Groups is approximately 47,000 words. This figure is calculated using industry-standard methods that consider genre-specific word density patterns, typical formatting and layout characteristics, and standard words-per-page ratios for published books.

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Who is the author of Modular Representation Theory of Finite Groups?

Modular Representation Theory of Finite Groups was written by Peter Schneider.

When was Modular Representation Theory of Finite Groups published?

The publication date for this specific edition is Nov 20, 2012. The original work may have been published on a different date.