"Boundary crossings and the distribution function of the maximum of Brownian sheet"

Endre Csáki, Davar Khoshnevisan and Zhan Shi

Summary: Our main intention is to describe the behavior of the (cumulative) distribution function of the random variable M_0,1:= sup_{0< s,t< 1}W(s,t) near 0, where W denotes one-dimensional, two-parameter Brownian sheet. A remarkable result of Florit and Nualart (1995) asserts that M_0,1 has a smooth density function with respect to Lebesgue's measure. Our estimates, in turn, seem to imply that the behavior of the density function of M_0,1 near 0 is quite exotic and, in particular, there is no clear-cut notion of a two-parameter reflection principle. We also consider the supremum of Brownian sheet over rectangles that are away from the origin. We apply our estimates to get an infinite dimensional analogue of Hirsch's theorem for Brownian motion.

Keywords: Tail probability, quasi-sure analysis, Brownian sheet.

AMS 1991 subject classification: 60G60; 60G17.