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The authors present a rigorous treatment of the first principles of the algebraic and analytic core of quantum field theory. Their aim is to correlate modern mathematical theory with the explanation of the observed process of particle production and of particle-wave duality that heuristic quantum field theory provides. Many topics are treated here in book form for the first time, from the origins of complex structures to the quantization of tachyons and domains of dependence for quantized wave equations.
This work begins with a comprehensive analysis, in a universal format, of the structure and characterization of free fields, which is illustrated by applications to specific fields. Nonlinear local functions of both free fields (or Wick products) and interacting fields are established mathematically in a way that is consistent with the basic physical constraints and practice. Among other topics discussed are functional integration, Fourier transforms in Hilbert space, and implementability of canonical transformations.
The authors address readers interested in fundamental mathematical physics and who have at least the training of an entering graduate student. A series of lexicons connects the mathematical development with the underlying physical motivation or interpretation. The examples and problems illustrate the theory and relate it to the scientific literature.
Introduction to Algebraic and Constructive Quantum Field Theory
by Baez, John C.; Segal, Irving Ezra; Zhou, ZhengfangFormat: Hardcover
Pub. Date: 1992-08-01
Publisher(s): Princeton Univ Pr
List Price: $75.00
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Summary
Table of Contents
| Introduction | |
| The Free Boson Field | p. 3 |
| Weyl and Heisenberg systems | p. 4 |
| Functional integration | p. 15 |
| Quasi-invariant distributions | p. 25 |
| Absolute continuity | p. 30 |
| Irreducibility and ergodicity | p. 37 |
| The Fourier-Wiener transform | p. 41 |
| The structure of [Gamma] and wave-particle duality | p. 47 |
| Implications of wave-particle duality | p. 57 |
| Characterization of the free boson field | p. 62 |
| The complex wave representation | p. 64 |
| Analytic features of the complex wave representation | p. 70 |
| The Free Fermion Field | p. 75 |
| Clifford systems | p. 75 |
| Existence of the free fermion field | p. 80 |
| The real wave representation | p. 82 |
| The complex wave representation | p. 89 |
| Properties of the Free Fields | p. 96 |
| The exponential laws | p. 97 |
| Irreducibility | p. 99 |
| Representation of the orthogonal group by measure-preserving transformations | p. 100 |
| Bosonic quantization of symplectic dynamics | p. 105 |
| Fermionic quantization of orthogonal dynamics | p. 113 |
| Absolute Continuity and Unitary Implementability | p. 118 |
| Equivalence of distributions | p. 119 |
| Quasi-invariant distributions and Weyl systems | p. 121 |
| Ergodicity and irreducibility of Weyl pairs | p. 124 |
| Infinite products of Hilbert spaces | p. 125 |
| Affine transforms of the isonormal distribution | p. 130 |
| Implementability of orthogonal transformations on the fermion field | p. 135 |
| C*-Algebraic Quantization | p. 142 |
| Weyl algebras over a linear symplectic space | p. 143 |
| Regular states of the general boson field | p. 147 |
| The representation-independent Clifford algebra | p. 149 |
| Lexicon: The distribution of occupation numbers | p. 150 |
| Quantization of Linear Differential Equations | p. 153 |
| The Schrodinger equation | p. 154 |
| Quantization of second-order equations | p. 158 |
| Finite propagation velocity | p. 160 |
| Quantization of the Dirac equation | p. 162 |
| Quantization of global spaces of wave functions | p. 168 |
| Renormalized Products of Quantum Fields | p. 174 |
| The algebra of additive renormalization | p. 174 |
| Renormalized products of the free boson field | p. 184 |
| Regularity properties of boson field operators | p. 190 |
| Renormalized local products of field operators | p. 200 |
| Construction of Nonlinear Quantized Fields | p. 208 |
| The L[subscript p] scale | p. 210 |
| Renormalized products at fixed time | p. 214 |
| Properties of fixed-time renormalization | p. 223 |
| The semigroup generated by the interaction Hamiltonian | p. 227 |
| The pseudo-interacting field | p. 229 |
| Dynamic causality | p. 233 |
| The local quantized equation of motion | p. 237 |
| Appendix A Principal Notations | p. 251 |
| Appendix B Universal Fields and the Quantization of Wave Equations | p. 254 |
| Glossary | p. 258 |
| Bibliography | p. 281 |
| Index | p. 289 |
| Table of Contents provided by Blackwell. All Rights Reserved. |
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