A factorization formula for the partition function in the semi-discrete parabolic Anderson model

Abstract

We consider a continuous-time simple symmetric random walk on the integer lattice Zd in dimension d ≥ 3, subject to a random potential given by a field of two-sided Wiener processes. In the high-temperature regime, we prove the existence of the L2- and almost sure limits of the partition function as time t ∞, and show that these limiting partition functions are positive almost surely. Our main result is a factorization formula for the point-to-point partition function, which is shown to be valid up to any sub-ballistic scale.