Heat coefficients of surfaces with curved conic singularities

Abstract

Let (M,g) be a two-dimensional Riemannian manifold of finite diameter with a conical singularity. Under the assumption that the metric near the cone point C is rotationally invariant, but not necessarily flat, we give an explicit formula for the coefficient b1/2(C) in the heat trace expansion tr(exp(-tg))t0 (4π t)-1Σj=0∞ aj(M) tj+Σj=0∞ bj/2(C)tj/2+Σj=0∞ cj/2(C) tj/2 t. In the case that the Gaussian curvature K of (M,g) satisfies |K(p)|∞ as p C, we show that b1/2(C) varies irrationally under constant rescalings of the distance circles near the cone point. This is a sharp contrast to the behavior of b0(C) and of those coefficients bj(C) which appear in certain known formulas in the case of orbifold cone points or corners of geodesic polygons.

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