Alexei Kanel-Belov | Yakov Karasik | Louis Halle Rowen

Computational Aspects of Polynomial Identities

Name: Computational Aspects of Polynomial Identities
Brand: Taylor & Francis Ltd
SKU: 9780367445805
Price: 76.99 EUR
Availability: InStock

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Product variants

A01=Alexei Kanel-Belov

A01=Louis Halle Rowen

A01=Yakov Karasik

advanced PI-theory applications

affine

Affine Algebra

algebra

Algebraic Closure

associative algebra theory

Author_Alexei Kanel-Belov

Author_Louis Halle Rowen

Author_Yakov Karasik

Category=PBF

central

Central Polynomial

combinatorial algebraic structures

Cyclically Conjugate

diagrams

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

finite dimensional algebra techniques

free

Free Algebra

Free Associative Algebra

Generalized Polynomials

GK Dimension

grassmann

Grassmann Algebra

group

Group Algebra

Hilbert Series

Homogeneous Polynomials

Jacobson Ring

Kemer's Theorem

Kemer’s Theorem

lie-*

Minimal Left Ideals

multilinear

Multilinear Identity

Multilinear Polynomial

Nilpotence Index

Nilpotent Ideal

Noetherian algebra methods

Polynomial Identities

representation theory GL

Restricted Lie Algebra

Specht Module

superalgebra structure

Trace Identity

Weyl Module

young

Young Diagram

Product details

ISBN 9780367445805
Weight: 453g
Dimensions: 156 x 234mm
Publication Date: 28 Nov 2019
Publisher: Taylor & Francis Ltd
Publication City/Country: GB
Product Form: Paperback

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Computational Aspects of Polynomial Identities: Volume l, Kemer’s Theorems, 2nd Edition presents the underlying ideas in recent polynomial identity (PI)-theory and demonstrates the validity of the proofs of PI-theorems. This edition gives all the details involved in Kemer’s proof of Specht’s conjecture for affine PI-algebras in characteristic 0.

The book first discusses the theory needed for Kemer’s proof, including the featured role of Grassmann algebra and the translation to superalgebras. The authors develop Kemer polynomials for arbitrary varieties as tools for proving diverse theorems. They also lay the groundwork for analogous theorems that have recently been proved for Lie algebras and alternative algebras. They then describe counterexamples to Specht’s conjecture in characteristic p as well as the underlying theory. The book also covers Noetherian PI-algebras, Poincaré–Hilbert series, Gelfand–Kirillov dimension, the combinatoric theory of affine PI-algebras, and homogeneous identities in terms of the representation theory of the general linear group GL.

Through the theory of Kemer polynomials, this edition shows that the techniques of finite dimensional algebras are available for all affine PI-algebras. It also emphasizes the Grassmann algebra as a recurring theme, including in Rosset’s proof of the Amitsur–Levitzki theorem, a simple example of a finitely based T-ideal, the link between algebras and superalgebras, and a test algebra for counterexamples in characteristic p.

Alexei Kanel-Belov is a professor in the Department of Mathematics at Bar-Ilan University. His research interests include ring theory, semigroup theory, polynomial automorphisms, quantization, symbolical dynamic combinatorial geometry and its mechanical applications, elementary mathematics, and mathematical education.

Yakov Karasik completed his doctorate at the Department of Mathematics at Technion - Israel Institute of Technology.

Louis Halle Rowen is a professor in the Department of Mathematics at Bar-Ilan University. His research interests include noncommutative algebra, finite dimensional division algebras, the structure theory of rings, and tropical algebras.