Abstract
This paper deals with two aspects of the theory of characteristic classes of star products: first, on an arbitrary Poisson manifold, we describe Morita equivalent star products in terms of their Kontsevich classes; second, on symplectic manifolds, we describe the relationship between Kontsevich's and Fedosov's characteristic classes of star products.
Received: 2009-10-02
Revised: 2010-07-08
Published Online: 2012-January
Published in Print: 2012-January
Walter de Gruyter Berlin New York 2012
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Articles in the same Issue
- BerezinToeplitz quantization on Khler manifolds
- BerezinToeplitz quantization on Khler manifolds
- Ricci flow of non-collapsed three manifolds whose Ricci curvature is bounded from below
- Morita equivalence and characteristic classes of star products
- Unitary invariants for Hilbert modules of finite rank
- Critre pour l'intgralit des coefficients de Taylor des applications miroir
Articles in the same Issue
- BerezinToeplitz quantization on Khler manifolds
- BerezinToeplitz quantization on Khler manifolds
- Ricci flow of non-collapsed three manifolds whose Ricci curvature is bounded from below
- Morita equivalence and characteristic classes of star products
- Unitary invariants for Hilbert modules of finite rank
- Critre pour l'intgralit des coefficients de Taylor des applications miroir