A Sub-Gaussian estimate for Dirichlet Heat Kernels on Tubular Neighbourhoods and Tightness of Conditional Brownian Motion

Abstract

We prove tightness of a family of path measures on tubes L() of small diameters around a closed and connected submanifold L of another Riemannian manifold M. Together with a convergence result for Dirichlet semigroups on tubular neighbourhoods, that implies weak convergence of the measures as the tube radius tends to zero to a measure supported by the path space of the submanifold. As a consequence, we obtain weak convergence of the measures obtained by conditioning Brownian motion to stay within the tubes L() up to a finite time T>0, and we identify the limit measure.