Trace Rings of Generic 2 by 2 Matrices

Trace Rings of Generic 2 by 2 Matrices
Title Trace Rings of Generic 2 by 2 Matrices PDF eBook
Author Lieven Le Bruyn
Publisher American Mathematical Soc.
Pages 110
Release 1987
Genre Clifford algebras
ISBN 0821824252

Download Trace Rings of Generic 2 by 2 Matrices Book in PDF, Epub and Kindle

In this paper we study the trace ring of [italic]m generic 2 by 2 matrices [capital Greek]Pi[italic subscript]m,2. It is shown that it is a polynomial ring over the generic Clifford algebra for [italic]m-ary quadratic forms of rank [less than or equal to] 3. We prove that it is a Cohen-Macaulay module, i.e. it is a free module of finite rank over a polynomial subring of the center. This explains the existence of a functional equation for its Poincaré series.

Polynomial Identity Rings

Polynomial Identity Rings
Title Polynomial Identity Rings PDF eBook
Author Vesselin Drensky
Publisher Birkhäuser
Pages 197
Release 2012-12-06
Genre Mathematics
ISBN 3034879342

Download Polynomial Identity Rings Book in PDF, Epub and Kindle

These lecture notes treat polynomial identity rings from both the combinatorial and structural points of view. The greater part of recent research in polynomial identity rings is about combinatorial questions, and the combinatorial part of the lecture notes gives an up-to-date account of recent research. On the other hand, the main structural results have been known for some time, and the emphasis there is on a presentation accessible to newcomers to the subject.

The Polynomial Identities and Invariants of $n \times n$ Matrices

The Polynomial Identities and Invariants of $n \times n$ Matrices
Title The Polynomial Identities and Invariants of $n \times n$ Matrices PDF eBook
Author Edward Formanek
Publisher American Mathematical Soc.
Pages 65
Release 1991
Genre Mathematics
ISBN 0821807307

Download The Polynomial Identities and Invariants of $n \times n$ Matrices Book in PDF, Epub and Kindle

The theory of polynomial identities, as a well-defined field of study, began with a well-known 1948 article of Kaplansky. The field has since developed along two branches: the structural, which investigates the properties of rings which satisfy a polynomial identity; and the varietal, which investigates the set of polynomials in the free ring which vanish under all specializations in a given ring. This book is based on lectures delivered during an NSF-CBMS Regional Conference, held at DePaul University in July 1990, at which the author was the principal lecturer. The first part of the book is concerned with polynomial identity rings. The emphasis is on those parts of the theory related to n x n matrices, including the major structure theorems and the construction of certain polynomials identities and central polynomials for n x n matrices. The ring of generic matrices and its centre is described. The author then moves on to the invariants of n x n matrices, beginning with the first and second fundamental theorems, which are used to describe the polynomial identities satisfied by n x n matrices. One of the exceptional features of this book is the way it emphasizes the connection between polynomial identities and invariants of n x n matrices. Accessible to those with background at the level of a first-year graduate course in algebra, this book gives readers an understanding of polynomial identity rings and invariant theory, as well as an indication of current problems and research in these areas.

Rings with Polynomial Identities and Finite Dimensional Representations of Algebras

Rings with Polynomial Identities and Finite Dimensional Representations of Algebras
Title Rings with Polynomial Identities and Finite Dimensional Representations of Algebras PDF eBook
Author Eli Aljadeff
Publisher American Mathematical Soc.
Pages 630
Release 2020-12-14
Genre Education
ISBN 1470451743

Download Rings with Polynomial Identities and Finite Dimensional Representations of Algebras Book in PDF, Epub and Kindle

A polynomial identity for an algebra (or a ring) A A is a polynomial in noncommutative variables that vanishes under any evaluation in A A. An algebra satisfying a nontrivial polynomial identity is called a PI algebra, and this is the main object of study in this book, which can be used by graduate students and researchers alike. The book is divided into four parts. Part 1 contains foundational material on representation theory and noncommutative algebra. In addition to setting the stage for the rest of the book, this part can be used for an introductory course in noncommutative algebra. An expert reader may use Part 1 as reference and start with the main topics in the remaining parts. Part 2 discusses the combinatorial aspects of the theory, the growth theorem, and Shirshov's bases. Here methods of representation theory of the symmetric group play a major role. Part 3 contains the main body of structure theorems for PI algebras, theorems of Kaplansky and Posner, the theory of central polynomials, M. Artin's theorem on Azumaya algebras, and the geometric part on the variety of semisimple representations, including the foundations of the theory of Cayley–Hamilton algebras. Part 4 is devoted first to the proof of the theorem of Razmyslov, Kemer, and Braun on the nilpotency of the nil radical for finitely generated PI algebras over Noetherian rings, then to the theory of Kemer and the Specht problem. Finally, the authors discuss PI exponent and codimension growth. This part uses some nontrivial analytic tools coming from probability theory. The appendix presents the counterexamples of Golod and Shafarevich to the Burnside problem.

Invariant Theory

Invariant Theory
Title Invariant Theory PDF eBook
Author Sebastian S. Koh
Publisher Springer
Pages 111
Release 2006-11-15
Genre Mathematics
ISBN 3540479082

Download Invariant Theory Book in PDF, Epub and Kindle

This volume of expository papers is the outgrowth of a conference in combinatorics and invariant theory. In recent years, newly developed techniques from algebraic geometry and combinatorics have been applied with great success to some of the outstanding problems of invariant theory, moving it back to the forefront of mathematical research once again. This collection of papers centers on constructive aspects of invariant theory and opens with an introduction to the subject by F. Grosshans. Its purpose is to make the current research more accesssible to mathematicians in related fields.

Algebraic Groups. Utrecht 1986

Algebraic Groups. Utrecht 1986
Title Algebraic Groups. Utrecht 1986 PDF eBook
Author Arjeh M. Cohen
Publisher Springer
Pages 291
Release 2006-11-15
Genre Mathematics
ISBN 3540478345

Download Algebraic Groups. Utrecht 1986 Book in PDF, Epub and Kindle

From 1-4 April 1986 a Symposium on Algebraic Groups was held at the University of Utrecht, The Netherlands, in celebration of the 350th birthday of the University and the 60th of T.A. Springer. Recognized leaders in the field of algebraic groups and related areas gave lectures which covered wide and central areas of mathematics. Though the fourteen papers in this volume are mostly original research contributions, some survey articles are included. Centering on the Symposium subject, such diverse topics are covered as Discrete Subgroups of Lie Groups, Invariant Theory, D-modules, Lie Algebras, Special Functions, Group Actions on Varieties.

Graded Orders

Graded Orders
Title Graded Orders PDF eBook
Author F.M., van Oystaeyen
Publisher Springer Science & Business Media
Pages 211
Release 2012-12-06
Genre Mathematics
ISBN 1461239443

Download Graded Orders Book in PDF, Epub and Kindle

In a clear, well-developed presentation this book provides the first systematic treatment of structure results for algebras which are graded by a goup. The fruitful method of constructing graded orders of special kind over a given order, culminating in applications of the construction of generalized Rees rings associated to divisors, is combined with the theory of orders over graded Krull domains. This yields the construction of generalized Rees rings corresponding to the central ramification divisor of the orders and the algebraic properties of the constructed orders. The graded methods allow the study of regularity conditions on order. The book also touches upon representation theoretic methods, including orders of finite representation type and other aspects of this theory applicable to the classification of orders. The final chapter describes the ring theoretical approach to the classification of orders of global dimension two, originally carried out by M. Artin using more geometrical methods. Since its subject is important in many research areas, this book will be valuable reading for all researchers and graduate students with an interest in non-commutative algebra.