Asymptotics for the heat kernel in multicone domains

Abstract

A multi cone domain ⊂eq Rn is an open, connected set that resembles a finite collection of cones far away from the origin. We study the rate of decay in time of the heat kernel p(t,x,y) of a Brownian motion killed upon exiting , using both probabilistic and analytical techniques. We find that the decay is polynomial and we characterize t∞ t1+αp(t,x,y) in terms of the Martin boundary of at infinity, where α>0 depends on the geometry of . We next derive an analogous result for t/2Px(T >t), with = 1+α - n/2, where T is the exit time form . Lastly, we deduce the renormalized Yaglom limit for the process conditioned on survival.