Heat content and inradius for regions with a Brownian boundary

Abstract

In this paper we consider β[0; s], Brownian motion of time length s > 0, in m-dimensional Euclidean space Rm and on the m-dimensional torus Tm. We compute the expectation of (i) the heat content at time t of Rm β[0; s] for fixed s and m = 2,3 in the limit t 0, when β[0; s] is kept at temperature 1 for all t > 0 and Rm β[0; s] has initial temperature 0, and (ii) the inradius of Rm β[0; s] for m = 2,3,·s in the limit s → ∞.