Parabolic Anderson Model in the Hyperbolic Space. Part II: Quenched Asymptotics

Abstract

We establish the exact quenched asymptotic growth of the solution to the parabolic Anderson model (PAM) in the hyperbolic space with a regular, stationary, time-independent Gaussian potential. More precisely, we show that with probability one, the solution u to PAM with constant initial data has pointwise growth asymptotics \[ u(t,x) eL*t5/3+o(t5/3) \] as t → +∞. Both the power t5/3 on the exponential and the exact value of L* are different from their counterparts in the Euclidean situation. They are determined through an explicit optimisation procedure. Our proof relies on certain fine localisation techniques, which also reveals a stronger non-Euclidean localisation mechanism.