Precise high moment asymptotics for parabolic Anderson model with log-correlated Gaussian field

Abstract

In this paper, we consider the continuous parabolic Anderson model (PAM) driven by a time-independent log-correlated Gaussian field (LGF). We obtain an asymptotic result of E\12Σ j,k=1N∫0t∫0tγ(Bj(s)-Bk(r))drds\(N→ ∞) which is composed of the independent Brownian motions \Bj(s)\ and the function γ approximating to a logarithmic potential at 0, such as the covariances of massive free field and Bessel field. Based on the asymptotic result, we get the precise high moment asymptotics for Feynman-Kac formula of the PAM with LGF.