## Differential geometrical methods in mathematical physics: proceedings of the symposium held at the University of Bonn, July 1-4, 1975 |

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### Contents

Geometric Quantization | 1 |

R J BLATTNER The metalinear geometry of nonreal polarizations | 11 |

J SNIATYCKI On cohomology groups appearing | 46 |

Copyright | |

19 other sections not shown

### Other editions - View all

Differential Geometrical Methods in Mathematical Physics K. Bleuler,A. Reetz No preview available - 2014 |

Differential Geometrical Methods in Mathematical Physics: Proceedings of the ... K. Bleuler,Axel Reetz,A. Reetz No preview available - 1977 |

### Common terms and phrases

action assume bilinear called classical cohomology complex components condition connection consider constant corresponding covariant curvature curve defined definition denote derivation Diff differential forms dimension Dirac E(g_ elements equations equivalent example exists fibration fibre field theory finite dimensional follows formal frame function gauge geometric given global graded algebras graded commutative algebra graded Lie algebra graded Lie group graded manifolds graded symplectic graded vector space Hamiltonian hence hermitian holonomy group homogeneous homomorphism Hopf algebra implies induces infinitesimal integral invariant isomorphism Lagrangian Lemma Lie group Lie superalgebra line bundle line bundle sheaf linear Math metric module morphism notation open set operator phase space Phys physical Poisson bracket proof Proposition quantization quantum Remark representation resp respect restriction satisfying scalar singularity smooth solutions spinor subalgebra subgroup submanifold subspace symmetry symplectic manifold tangent space tensor Theorem topology trivial unique vanishes vector bundle vector field zero