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Group Theory in Physics
An Introduction
John F. Cornwell
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eBook - ePub
Group Theory in Physics
An Introduction
John F. Cornwell
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This book, an abridgment of Volumes I and II of the highly respected Group Theory in Physics, presents a carefully constructed introduction to group theory and its applications in physics. The book provides anintroduction to and description of the most important basic ideas and the role that they play in physical problems. The clearly written text contains many pertinent examples that illustrate the topics, even for those with no background in group theory.This work presents important mathematical developments to theoretical physicists in a form that is easy to comprehend and appreciate. Finite groups, Lie groups, Lie algebras, semi-simple Lie algebras, crystallographic point groups and crystallographic space groups, electronic energy bands in solids, atomic physics, symmetry schemes for fundamental particles, and quantum mechanics are all covered in this compact new edition.
- Covers both group theory and the theory of Lie algebras
- Includes studies of solid state physics, atomic physics, and fundamental particle physics
- Contains a comprehensive index
- Provides extensive examples
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Informations
Sujet
Scienze fisicheSous-sujet
Fisica computazionale e matematicaChapter 1
The Basic Framework
1 The concept of a group
The aim of this chapter is to introduce the idea of a group, to give some physically important examples, and then to indicate immediately how this notion arises naturally in physical problems, and how the related concept of a group representation lies at the heart of the quantum mechanical formulation. With the basic framework established, the next four chapters will explore in more detail the relevant properties of groups and their representations before the application to physical problems is taken up in earnest in Chapter 6.
To mathematicians a group is an object with a very precise meaning. It is a set of elements that must obey four group axioms. On these is based a most elaborate and fascinating theory, not all of which is covered in this book. The development of the theory does not depend on the nature of the elements themselves, but in most physical applications these elements are transformations of one kind or another, which is why T will be used to denote a typical group member.
Definition
Group G
A set G of elements is called a âgroupâ if the following four âgroup axiomsâ are satisfied:
(a) There exists an operation which associates with every pair of elements T and TâČ of G another element Tâł of G. This operation is called multiplication and is written as Tâł = TTâČ, Tâł being described as the âproduct of T with TâČâ.
(b) For any three elements T, TâČ and Tâł of G
This is known as the âassociative lawâ for group multiplication. (The interpretation of the left-hand side of Equation (1.1) is that the product TTâČ is to be evaluated first, and then multiplied by Tâł whereas on the right-hand side T is multiplied by the product TâČTâł.)
(c) There exists an identity element E which is contained in G such that
for every element T of G.
(d) For each element T of G there exists an inverse element Tâ1 which is also contained in G such that
This definition covers a diverse range of possibilities, as the following examples indicate.