Large deviation principle for the intersection measure of Brownian motions on unbounded domains

Abstract

Consider the intersection measure ISt of p independent Brownian motions on Rd. In this article, we prove the large deviation principle for the normalized intersection measure t-pISt as t→ ∞, before exiting a (possibly unbounded) domain D⊂Rd with smooth boundary. This is an extension of [W. K\"onig and C. Mukherjee: Communications on Pure and Applied Mathematics, 66(2):263--306, 2013] which deals with the case D is bounded. Our essential contribution is to prove the so-called super-exponential estimate for the intersection measure of killed Brownian motions on such D by an application of the Chapman-Kolmogorov relation.