Constructive Quantum Field Theory
Constructive Quantum Field Theory [electronic resource] /
edited by G. Velo, A. Wightman.
- III, 334 p. online resource.
- Lecture Notes in Physics, 25 0075-8450 ; .
- Lecture Notes in Physics, 25 .
Functional analysis and probability theory -- Appendix: Sample Field Behavior for the Free Markov Random Field -- Euclidean Green’s Functions and Wightman Distributions -- Probability theory and euclidean field theory -- The Glimm-Jaffe ø-bound : A markov proof -- The particle structure of the weakly coupled ?(?)2 model and other applications of high temperature expansions -- The particle structure of the weakly coupled P(?)2 model and other applications of high temperature expansions -- Bose field theory as classical statistical mechanics. I. The variational principle and the equilibrium equations -- Bose field theory as classical statistical mechanics. II. The lattice approximation and correlation inequalities -- Bose field theory as classical statistical mechanics. III. The classical ising approximation -- Constructive macroscopic quantum electrodynamics -- Perturbation expansion for the-P(?)2 schwinger functions -- Nondiscrete spins and the Lee-Yang Theorem -- Euclidean fermi fields.
9783540379126
10.1007/BFb0113079 doi
Physics.
Physics, general.
QC1-75
530
Functional analysis and probability theory -- Appendix: Sample Field Behavior for the Free Markov Random Field -- Euclidean Green’s Functions and Wightman Distributions -- Probability theory and euclidean field theory -- The Glimm-Jaffe ø-bound : A markov proof -- The particle structure of the weakly coupled ?(?)2 model and other applications of high temperature expansions -- The particle structure of the weakly coupled P(?)2 model and other applications of high temperature expansions -- Bose field theory as classical statistical mechanics. I. The variational principle and the equilibrium equations -- Bose field theory as classical statistical mechanics. II. The lattice approximation and correlation inequalities -- Bose field theory as classical statistical mechanics. III. The classical ising approximation -- Constructive macroscopic quantum electrodynamics -- Perturbation expansion for the-P(?)2 schwinger functions -- Nondiscrete spins and the Lee-Yang Theorem -- Euclidean fermi fields.
9783540379126
10.1007/BFb0113079 doi
Physics.
Physics, general.
QC1-75
530