Full asymptotic expansion of the heat trace for non-self-adjoint elliptic cone operators
Abstract
The operator e-tA and its trace are investigated in the case when A is a non-self-adjoint elliptic differential operator on a manifold with conical singularities. Under a certain spectral condition (parameter-ellipticity) we obtain a full asymptotic expansion in t of the heat trace as t 0+. As in the smooth compact case, the problem is reduced to the investigation of the resolvent (A-λ)-1. The main step will consist in approximating this operator family by a parametrix to A-λ using a suitable parameter-dependent calculus.
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