Heat kernel estimate in a conical singular space

Abstract

Let (X,g) be a product cone with the metric g=dr2+r2h, where X=C(Y)=(0,∞)r× Y and the cross section Y is a (n-1)-dimensional closed Riemannian manifold (Y,h). We study the upper boundedness of heat kernel associated with the operator LV=-g+V0 r-2, where -g is the positive Friedrichs extension Laplacian on X and V=V0(y) r-2 and V0∈C∞(Y) is a real function such that the operator -h+V0+(n-2)2/4 is a strictly positive operator on L2(Y).The new ingredient of the proof is the Hadamard parametrix and finite propagation speed of wave operator on Y.

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