Uniform, localized asymptotics for sub-Riemannian heat kernels and diffusions

Abstract: We show how Molchanov's method provides a systematic approach to determining the small-time asymptotics of the heat kernel on a sub-Riemannian manifold away from any abnormal minimizers. The expansion is closely connected to the structure of the minimizing geodesics between two points. If the normal form of the exponential map at the minimal geodesics between two points is sufficiently explicit, a complete asymptotic expansion of the heat kernel can, in principle, be given. (But one can also exhibit metrics fo… Show more