Moments and Lyapunov exponents for the parabolic Anderson model
Abstract
We study the parabolic Anderson model in (1+1) dimensions with nearest neighbor jumps and space-time white noise (discrete space/continuous time). We prove a contour integral formula for the second moment and compute the second moment Lyapunov exponent. For the model with only jumps to the right, we prove a contour integral formula for all moments and compute moment Lyapunov exponents of all orders.
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