Mathematics – Differential Geometry
Scientific paper
2009-06-08
Mathematics
Differential Geometry
small changes to agree with part II
Scientific paper
We give a parametrix construction for the signature operator on any compact, oriented, stratified pseudomanifold X which satisfies the Witt condition. This construction is inductive. It is then used to show that the signature operator is essentially self-adjoint and has discrete spectrum of finite multiplicity, so that its index -- the analytic signature of X -- is well-defined. We then show how to couple this construction to a C^*_r(Gamma) Mischenko bundle associated to any Galois covering of X with covering group Gamma. The appropriate analogues of these same results are then proved, and it follows that we may define an analytic signature class as an element of the K-theory of C^*_r(Gamma). In a sequel to this paper we establish in this setting the full range of conclusions for this class which sometimes goes by the name of the signature package.
Albin Pierre
Leichtnam Eric
Mazzeo Rafe
Piazza Paolo
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