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David Cohen: Exponential integrators for nonlinear Schrödinger equations with white noise dispersion

Time: Thu 2018-01-18 14.15 - 15.00

Location: Room F11, Lindstedtsvägen 22, våningsplan 2, F-huset, KTH Campus.

Participating: David Cohen, Umeå University

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Abstract:


This presentation deals with the numerical integration in time of the nonlinear Schrödinger equation with power law nonlinearity and random dispersion. We introduce a new explicit exponential integrator for this purpose that integrates the noisy part of the equation exactly. We prove that this scheme is of mean-square order 1 and we draw consequences of this fact. We compare our exponential integrator with several other numerical methods from the literature. We finally propose a second exponential integrator, which is implicit and symmetric and, in contrast to the first one, preserves the L2-norm of the solution.

This presentation is based on a joint work with Guillaume Dujardin (INRIA Lille)