Mostly restricting himself to exchange rings with various kinds of conditions, Chen (mathematics, Hangzhou Normal U., China) treats the stable range condition as an element-wise condition on rings in
This monograph provides a comprehensive introduction to the Kazhdan-Lusztig theory of cells in the broader context of the unequal parameter case. Serving as a useful reference, the present volume off
This monograph is a comprehensive account of formal matrices, examining homological properties of modules over formal matrix rings and summarising the interplay between Morita contexts and K theory.Wh
This book provides an introduction to the basics and recent developments of commutative algebra. A glance at the contents of the first five chapters shows that the topics covered are ones that usually
NOTE: Before purchasing, check with your instructor to ensure you select the correct ISBN. Several versions of Pearson's MyLab & Mastering products exist for each title, and registrations are not tran
In this monograph, the authors develop a new theory of p-adic cohomology for varieties over Laurent series fields in positive characteristic, based on Berthelot's theory of rigid cohomology. Many
NOTE: Before purchasing, check with your instructor to ensure you select the correct ISBN. Several versions of Pearson's MyLab & Mastering products exist for each title, and registrations are not tran
The aim of “Algebra Practice Sets: 100 Problems & Solutions (Volume 1)” book is to help primary school students of Grade 9 and 10 (Class-IX, X) develop their Algebra problem solving skills and exp
Translated from the popular French edition, this book offers a detailed introduction to various basic concepts, methods, principles, and results of commutative algebra. It takes a constructive viewpoi
Introducing the representation theory of groups and finite dimensional algebras, first studying basic non-commutative ring theory, this book covers the necessary background on elementary homological a
This guide includes detailed, step-by-step solutions to all odd-numbered exercises in the section exercise sets and in the review exercises. It also includes detailed step-by-step solutions to all Mid
This guide includes detailed ,step-by-step solutions to all odd-numbered exercises in the section exercise sets and in the review exercises. It also includes detailed step-by-step solutions to all Mid
This guide includes detailed, step by step solutions to all odd-numbered exercises in the section exercise sets and in the review exercises. It also includes detailed step by step solutions to all Mid
The Student Workbook, which contains all of the Assessments, Activities, and Worksheets from the Instructor's Resource Binder, is used for classroom discussions, in-class activities, and group work.
Algebraic K-theory encodes important invariants for several mathematical disciplines, spanning from geometric topology and functional analysis to number theory and algebraic geometry. As is commonly e
The modular representation theory of Iwahori-Hecke algebras and this theory's connection to groups of Lie type is an area of rapidly expanding interest; it is one that has also seen a number of breakt
Polycyclic groups are built from cyclic groups in a specific way. They arise in many contexts within group theory itself but also more generally in algebra, for example in the theory of Noetherian rin
Algebra, as we know it today, consists of many different ideas, concepts and results. A reasonable estimate of the number of these different items would be somewhere between 50,000 and 200,000. Many o
The aim of this monograph is to give a self-contained introduction to the modern theory of finite transformation semigroups with a strong emphasis on concrete examples and combinatorial applications.
This book reflects the contemporary level of difference algebra; it contains a systematic study of partial difference algebraic structures and their applications, as well as the coverage of the classi
This book provides the reader with the tools to understand the ongoing classification and construction project of Lie superalgebras. It presents the material in as simple terms as possible. Coverage s
The theory of algebraic function fields over finite fields has its origins in number theory. However, after Goppa`s discovery of algebraic geometry codes around 1980, many applications of function fi
Carlson (University of Georgia) explains group cohomology, from introductory material through recent developments in the field. Focus is on the interaction of group cohomology with representation theo
NOTE: Before purchasing, check with your instructor to ensure youselect the correct ISBN. Several versions of Pearson's MyLab & Mastering products exist for each title, and registrations are not t
Using many step-by-step demonstration examples, helpful diagrams, informative "Math Fact" summaries, and graphing calculator approaches, this book presents: A clearly organized chapter-by-chapter r
This textbook presents all the fundamental topics of discrete mathematics that are introduced from the perspectives of a pure mathematician and an applied computer scientist. The integration of the tw
Buildings are combinatorial constructions successfully exploited to study groups of various types. The vertex set of a building can be naturally decomposed into subsets called Grassmannians. The book
