Analytic formulas for topological degree of non-smooth mappings: the odd-dimensional case

Details Analytic formulas for topological degree of non-smooth mappings: the odd-dimensional case Analytic formulas for topological degree of non-smooth mappings: the odd-dimensional case

2010-04-07

arxiv.org/abs/1004.1018v1

Mathematics

K-Theory and Homology

23 pages

Scientific paper

The notion of topological degree is studied for mappings from the boundary of a relatively compact strictly pseudo-convex domain in a Stein manifold into a manifold in terms of index theory of Toeplitz operators on the Hardy space. The index formalism of non-commutative geometry is used to derive analytic integral formulas for the index of a Toeplitz operator with H\"older continuous symbol. The index formula gives an analytic formula for the degree of a H\"older continuous mapping from the boundary of a strictly pseudo-convex domain.

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