Hitting probabilities, thermal capacity, and Hausdorff dimension results for the Brownian sheet

Abstract

Let W= \W(t): t ∈ R+N \ be an (N, d)-Brownian sheet and let E ⊂ (0, ∞)N and F ⊂ Rd be compact sets. We prove a necessary and sufficient condition for W(E) to intersect F with positive probability and determine the essential supremum of the Hausdorff dimension of the intersection set W(E) F in terms of the thermal capacity of E × F. This extends the previous results of Khoshnevisan and Xiao (2015) for the Brownian motion and Khoshnevisan and Shi (1999) for the Brownian sheet in the special case when E ⊂ (0, ∞)N is an interval.