Introduction To The Quantum Yang Baxter Equation And Quantum Groups An Algebraic Approach
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Introduction to the Quantum Yang-Baxter Equation and Quantum Groups: An Algebraic Approach
Author: L.A. Lambe
language: en
Publisher: Springer Science & Business Media
Release Date: 2013-11-22
Chapter 1 The algebraic prerequisites for the book are covered here and in the appendix. This chapter should be used as reference material and should be consulted as needed. A systematic treatment of algebras, coalgebras, bialgebras, Hopf algebras, and represen tations of these objects to the extent needed for the book is given. The material here not specifically cited can be found for the most part in [Sweedler, 1969] in one form or another, with a few exceptions. A great deal of emphasis is placed on the coalgebra which is the dual of n x n matrices over a field. This is the most basic example of a coalgebra for our purposes and is at the heart of most algebraic constructions described in this book. We have found pointed bialgebras useful in connection with solving the quantum Yang-Baxter equation. For this reason we develop their theory in some detail. The class of examples described in Chapter 6 in connection with the quantum double consists of pointed Hopf algebras. We note the quantized enveloping algebras described Hopf algebras. Thus for many reasons pointed bialgebras are elsewhere are pointed of fundamental interest in the study of the quantum Yang-Baxter equation and objects quantum groups.
Hopf Algebras, Quantum Groups and Yang-Baxter Equations
This book is a printed edition of the Special Issue "Hopf Algebras, Quantum Groups and Yang-Baxter Equations" that was published in Axioms
Yang-Baxter Equation and Quantum Groups: An Algebraic Approach
The Yang-Baxter equation refers to a consistency equation which is based on the concept that particles may preserve their momentum while changing their quantum internal states in some scattering situations. It plays a significant role in theoretical physics and has numerous uses in various areas, ranging from condensed matter to string theory. The Yang-Baxter equation is linked to the universal gates from quantum computing and realizes a unification of some non-associative structures. The quantum Yang-Baxter equation led to the development of the theory of quantum groups. The theory was proposed as the language of quantum groups which is the suitable algebraic language for the solutions of quantum Yang-Baxter equation. This book aims to shed light on some of the unexplored aspects of Yang-Baxter equation and quantum groups. It presents researches and studies performed by experts across the globe. This book will serve as a reference to a broad spectrum of readers.