A Sublinear Variance Bound for Solutions of a Random Hamilton Jacobi Equation

Abstract

We estimate the variance of the value function for a random optimal control problem. The value function is the solution wε of a Hamilton-Jacobi equation with random Hamiltonian H(p,x,ω) = K(p) - V(x/ε,ω) in dimension d ≥ 2. It is known that homogenization occurs as ε 0, but little is known about the statistical fluctuations of wε. Our main result shows that the variance of the solution wε is bounded by O(ε/| ε|). The proof relies on a modified Poincar\'e inequality of Talagrand.