Nodal Geometry, Heat Diffusion and Brownian Motion

Abstract

We use tools from n-dimensional Brownian motion in conjunction with the Feynman-Kac formulation of heat diffusion to study nodal geometry on a compact Riemannian manifold M. On one hand we extend a theorem of Lieb and prove that any nodal domain λ almost fully contains a ball of radius 1λ. This also gives a slight refinement of a result by Mangoubi, concerning the inradius of nodal domains (Man2). On the other hand, we also prove that no nodal domain can be contained in a reasonably thin tubular neighbourhood of unions of finitely many surfaces inside M.