Trim 1/2 in off the top of all covers Front edge of spine-----------8.875in from the front edge of the paper. Trim small here ----- Trim large here --- TF2759 ISBN 3 7186 0033 1 *Small covers trim to (14.625 x 9.4) *Large covers trim to (18.875 x 11.4) Particle Physics ana Introduction to Field Theory Contemporary A series edited by Henry Primakoff, Concepts University of Pennsylvania in Physics Associate Editors: Eli Burstein University of Pennsylvania Willis Lamb University of Arizona Leon Lederman Fermi National Accelerator Laboratory Sir Rudolf Peierls Oxford University Mal Ruderman Columbia University Volume 1 Particle Physics and Introduction to Field Theory Additional volumes in preparation. Science Press (Beijing) Particle Physics ana Introduction to Field Theory T.D. 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Visit the Taylor & Francis Web site at http://www.taylorandfrancis.com and the CRC Press Web site at http://www.crcpress.com TO JEANNETTE TThhiiss ppaaggee iinntteennttiioonnaallllyy lleefftt bbllaannkk Contents Preface to the Series . . • . . . . . . . . . . . . . . • . . . . • . . . xv Preface xvii Part I: Introduction to Field Theory Chapter 1: Mechanics of a Finite System {Review) • • • • • • 3 1.1 Classical Mechanics • • • • • • • • • • • • • • • • • • • 3 1. 2 Quantization . . . . . . . . . . . . . . . . . . . . . . • . 4 1.3 Some Genera I Theorems • • • • • • • • • • • • • . • • 10 Chapter 2: The Spin-O Field • • • • • • • • • • • • • • • • .. • • 17 2.1 General Discussion • • • • • • • • . . • • • • . • • • • 17 2.2 Fourier Expansion (Free or Interacting Fields) • • • 20 2.3 Hilbert Space (Free or Interacting Fields) • . • • • 25 Chapter 3 : The Spin-! Field • • • • • • • • • • • • • • • • • • • • 29 3.1 Mathematical Preliminaries • • • . • • • • • • • • • • 29 3.2 Free Field . • • . . . . . . . . . . • • • • • • . • . • . . 31 3.3 Quantization (Free or Interacting Fields) • • • • • 32 3.4 Fourier Expansion {Free or Interacting Fields) • • • 34 3.5 Hilbert Space (Free or Interacting Fields) • • • • • 37 3.6 Momentum and Angular Momentum Operators • • • 41 3.7 Phase Factor Conventions between the Spinors • • 45 3.8 Two-component Theory • . • . • • • • • • • • • • • • • 49 Chapter 4: The Spin-1 Field (m I 0) •••••••.••••• 55 4. 1 Free Field ..........•.......•....•• 55 4.2 I11h~rading Field$ 58 Chapter 5: Feynman Diagrams 62 5.1 Heisenberg, Schr!XIinger and Interaction Representations • 62 5.2 S-Matrix 66 vii. 5.3 Time-ordered Products, Normal Products and Contractions 72 5.4 Perturbation Series •.•••••••.•.•...••• 78 5. 5 Wick Theorem ••••••••••.••.•.••.••• 80 5.6 App I i cations • . • • • • • . . • . • . . . • • • • • • . • 84 5.7 Differential Cross Sections for 1 + 2 - 1' + 2' + ..• + n' 92 Chapter 6 : Quantum Electrodynamics 103 6.1 Lagrangian •••..•••..•••.••••.••••• 103 6.2 Coulomb Gauge ••.•••••....•..•..•• 104 6.3 Quantization •••••.•••.••..••••••.• 107 6.4 Photon Propagator and Relativistic Invariance 109 6.5 Remarks •..•.••••••••••••••..•.••• 113 Chapter 7: Solitons 117 7.1 Early History . . • • • . • . . • • . • . . . . • • • . • 117 7.2 Definition, Classification and Some General Remarks 123 7.3 One-space-dimensional Examples • . • . . • • • • 128 -Topological soliton. Nontopological soliton. 7.4 Derrick Theorem . • • • . • • • • • • • • . • • • . . . 138 7.5 Solitons vs. Plane Waves . • • • . • • . • • . • • • 141 -One space-dimension. Two space-dimensions. Three space-dimensions. 7.6 Quantization • • . • . • • • • • • • • • . • • • . . . • 150 -Lagrangian, Hamiltonian and commutation relations. Coli ecti ve coordinates. Perturbation expansion. Part II : Particle Physics Chapter 8 : Order-of-magnitude Estimations 161 8.1 Radius of the Hydrogen Atom • • • • . . • • • . • 162 8.2 Hadron Size • • . • . . • . . . • • • • • • • . . . • • . 163 8.3 High-energy pp, 1rp and Kp Total Cross Sections 164 8.4 e+ + e- - (J+ + fJ- • • • • • • • • • • • . • • • • • • 165 8.5 v + N - ••· • • • • • • • • • . . • . • • • • . . . • 167 8.6 Compton Scattering • . • • • • . . . . . . • . • . . . 168 8.7 Mass Singularity and High-energy Behavior 170 8.8 e+ e- Pair Production by High-energy Photons 173 viii. Part IIA: Particle Physics: Symmetry Chapter 9 : General Discussion 177 9.1 Non-observables, Symmetry Transformations and Conservation Laws 178 9.2 Asymmetries and Observables • • • . • • • • • • . • 181 u Chapter 10 : 1 Symmetry and P, C Invari once • • • • • 189 10.1 QED as an Example • . . • . . • . • . • • . • • • • 189 10.2 Applications . • • • . . . . • . • . • • . . • • • • • . 199 -Furry theorem. Positronium states. Decay of a f spin-0 particle - 2y. Spin-1 particle 2y. 10.3 General Discussion • • • • . • • • • • • • • • • • . • 208 10.4 Baryon Number and Lepton Number • • . • • • • 210 Chapter 11 Isotopic Spin and G Parity 217 11. 1 lsospi n • • • . • . . • • • • • • • • • • . • • • • • . • • 21 7 -u 2 symmetry. lsospi n transformations. 11.2 G Parity • . . • • • . • • . • . • . • • . • • . . . . • 225 -Nucleon-antinucleon system. The quantum num ber G. 11.3 Applications to Mesons and Baryons • . • . . • • 230 -Pion. Vector mesons. A and kaon. Meson and baryon octets. 11.4 Isospin Violation • • • • . • • • • • • • • • . • • • • • 240 -Electromagnetic interaction. Weak interaction. u Chapter 12 : S 3 Symmetry • • • • • • • . • • • • • • • • • • • 251 12.1 Mathematical Preliminary . • • . • • • • • • • • • 253 -Tensors. Representations. Decomposition of ® ® . x Some further properties. Excur- sion to other groups. 12.2 Hadron States and Their Flavor and Color Symmetries • 265 -Pseudoscalar octet. Baryon spin--! octet and spin·~ decuplet. 12.3 Mass Formulas • • • • • • • • • • • • • . • • • • • . • 273 -Hasym and the spurion formulation. Octet mass formulas. Decuplet mass formula. ix.