量子場論第1卷

量子場論第1卷

《量子場論第1卷》是2014年5月1日世界圖書出版公司出版的圖書,作者是[美]溫伯格(Weinberg、S.)。

基本介紹

  • 中文名:量子場論第1卷
  • 作者:[美]溫伯格(Weinberg、S.)
  • 出版社:世界圖書出版公司
  • ISBN:9787510075872
內容簡介,圖書目錄,

內容簡介

Why another book on quantum field theory? Today the student of quantum field theory can choose from among a score of excellent books, several of them quite up-to-date. Another book will be worth while only if it offers something new in content or perspective.
As to content, although this book contains a good amount of new material, I suppose the most distinctive thing about it is its generality; I have tried throughout to discuss matters in a context that is as general as possible. This is in part because quantum field theory has found applications far removed from the scene of its old successes, quantum electrodynamics, but even more because I think that this generality will help to keep the important points from being submerged in the technicalities of specific theories. Of course, specific examples are frequently used to illustrate general points, examples that are chosen from contemporary particle physics or nuclear physics as well as from quantum electrodynamics.
It is, however, the perspective of this book, rather than its content, that provided my chief motivation in writing it. I aim to present quantum field theory in a manner that will give the reader the clearest possible idea of why this theory takes the form it does, and why in this form it does such a good job of describing the real world.

圖書目錄

PREFACE
NOTATION
1 HISTORICAL INTRODUCTION
1.1 Relativistic Wave Mechanics
1.2 The Birth of Quantum Field Theory
1.3 The Problem of Infinities
Bibliograpby
References
2 RELATIVISTIC QUANTUM MECHANICS
2.1 Quantum Mechanics
2.2 Symmetries
2.3 Quantum Lorentz Transformations
2.4 The Poincare Algebra
2.5 One-Particle States
2.6 Space Inversion and Time-Reversal
2.7 Projective Representations
Appendix A The Symmetry Representation Theorem
Appendix B Group Operators and Homotopy Classes
Appendix C In,rersions and Degenerate Multiplets
Problems
References
3 SCATTERING THEORY
3.1 'In' and 'Out' States
3.2 The S-matrix
3.3 Symmetries of the S-Matrix
……
4 THE CLUSTER DECOMPOSITION PRINCIPLE
5 QUANTUM FIELDS AND ANTIPARTICLES
6 THE FEYNMAN RULES
7 THE CANONICAL FORMALISM
8 ELECTRODYNAMICS
9 PATH-INTEGRAL METHODS
10 NON-PERTURBATIVE METHODS
11 ONE-LOOP RADIATIVE CORRECTIONS IN QUANTUM ELECTRODYNAMICS
13 INFRARED EFFECTS
14 BOUND STATES IN EXTERNAL FIELDS
AUTHOR INDEX
SUBJECT INDEX
OUTLINE OF VOLUME 2

圖書目錄

PREFACE
NOTATION
1 HISTORICAL INTRODUCTION
1.1 Relativistic Wave Mechanics
1.2 The Birth of Quantum Field Theory
1.3 The Problem of Infinities
Bibliograpby
References
2 RELATIVISTIC QUANTUM MECHANICS
2.1 Quantum Mechanics
2.2 Symmetries
2.3 Quantum Lorentz Transformations
2.4 The Poincare Algebra
2.5 One-Particle States
2.6 Space Inversion and Time-Reversal
2.7 Projective Representations
Appendix A The Symmetry Representation Theorem
Appendix B Group Operators and Homotopy Classes
Appendix C In,rersions and Degenerate Multiplets
Problems
References
3 SCATTERING THEORY
3.1 'In' and 'Out' States
3.2 The S-matrix
3.3 Symmetries of the S-Matrix
……
4 THE CLUSTER DECOMPOSITION PRINCIPLE
5 QUANTUM FIELDS AND ANTIPARTICLES
6 THE FEYNMAN RULES
7 THE CANONICAL FORMALISM
8 ELECTRODYNAMICS
9 PATH-INTEGRAL METHODS
10 NON-PERTURBATIVE METHODS
11 ONE-LOOP RADIATIVE CORRECTIONS IN QUANTUM ELECTRODYNAMICS
13 INFRARED EFFECTS
14 BOUND STATES IN EXTERNAL FIELDS
AUTHOR INDEX
SUBJECT INDEX
OUTLINE OF VOLUME 2

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