Optimal lower bounds on hitting probabilities for stochastic heat equations in spatial dimension k ≥ 1

Abstract

We establish a sharp estimate on the negative moments of the smallest eigenvalue of the Malliavin matrix γZ of Z := (u(s, y), u(t, x) - u(s, y)), where u is the solution to system of d non-linear stochastic heat equations in spatial dimension k ≥ 1. We also obtain the optimal exponents for the Lp-modulus of continuity of the increments of the solution and of its Malliavin derivatives. These lead to optimal lower bounds on hitting probabilities of the process \u(t, x): (t, x) ∈ [0, ∞[ × R\ in the non-Gaussian case in terms of Newtonian capacity, and improve a result in Dalang, Khoshnevisan and Nualart [Stoch PDE: Anal Comp 1 (2013) 94--151].