Lower bound on spatial asymptotic of parabolic Anderson model with narrow wedge initial condition

Abstract

Let \u(t\,,x): (t,x)∈ (0, ∞)× R\ be the solution to parabolic Anderson model with narrow wedge initial condition. Using the association property of parabolic Anderson model, we establish a lower bound on spatial asymptotic of the solution: align* R∞ |x|≤ R( u(t\,,x) + x22t)( R)2/3 ≥ 14(t2)1/3, a.s. align*

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