Mathew Joseph
Published 2017-06-17Version 1
We approximate the white-noise driven stochastic heat equation by replacing the fractional Laplacian by the generator of a discrete time random walk on the one dimensional lattice, and approximating white noise by a collection of i.i.d. mean zero random variables. As a consequence, we give an alternative proof of the weak convergence of the scaled partition function of directed polymers in the intermediate disorder regime, to the stochastic heat equation; an advantage of the proof is that it gives the convergence of all moments.
The intermediate disorder regime for a directed polymer model on a hierarchical lattice
Stability of the stochastic heat equation in $L^1([0,1])$
The Intermediate Disorder Regime for Brownian Directed Polymers in Poisson Environment
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