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Differential Geometrical Methods in Mathematical Physics II [1978]
- 1
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On the role of field theories in our physical conception of geometry
- 81
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Characteristic classes and solutions of gauge theories
- 105
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Classification of classical yang-mills fields
- 151
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Bundle representations and their applications
- 161
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Introduction to gauge theory
- 171
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The use of exterior forms in field theory
- 179
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Electromagnetic fields on manifolds: Betti numbers, monopoles and strings, minimal coupling
- 189
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Gravity is the gauge theory of the parallel — transport modification of the poincare group
- 217
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On the lifting of structure groups
- 247
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On the non-uniqueness of spin structure in superconductivity
- 255
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Conformal invariance in field theory
- 295
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Geometric quantization and the WKB approximation
- 311
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Some properties of half-forms
- 315
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On some approach to geometric quantization
- 329
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Representations associated to minimal co-adjoint orrits
- 351
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On the Schrödinger equation given by geometric quantisation
- 357
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Application of geometric quantization in quantum mechanics
- 369
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Thermodynamique et Geometrie
- 399
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Some preliminary remarks on the formal variational calculus of gel'fand and dikii
- 409
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Reducibility of the symplectic structure of minimal interactions
- 435
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Ambiguities in canonical transformations of classical systems and the spectra of quantum observables
- 459
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Quantum field theory in curved space-times a general mathematical framework
- 513
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On functional integrals in curved spacetime
- 535
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Observables for quantum fields on curved background
- 567
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Quantization of fields on a curved background
- 573
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Supergravity
- 597
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Representations of classical lie superalgebras
