Convergence to SPDE of the Schrodinger equation with large, random potential

Abstract

We study the asymptotic behavior of solutions to the Schr\"odinger equation with large-amplitude, highly oscillatory, random potential. In dimension d<m, where m is the order of the leading operator in the Schr\"odinger equation, we construct the heterogeneous solution by using a Duhamel expansion and prove that it converges in distribution, as the correlation length goes to 0, to the solution of a stochastic differential equation, whose solution is represented as a sum of iterated Stratonovich integral, over the space C([0,+∞),S'). The uniqueness of the limiting solution in a dense space of L2(×Rd) is shown by verifying the property of conservation of mass for the Schr\"odinger equation. In dimension d>m, the solution to the Schr\"odinger equation is shown to converge in L2(×Rd) to a deterministic Schr\"odinger solution in ZB-12.