Convergence of a θ-scheme to solve the stochastic nonlinear Schrödinger equation with Stratonovich noise
Abstract
We propose a θ-scheme to discretize the d-dimensional stochastic cubic Schrödinger equation in Stratono\-vich sense. A uniform bound for the Hamiltonian of the discrete problem is obtained, which is a crucial property to verify the convergence in probability towards a mild solution. Furthermore, based on the uniform bounds of iterates in H2(O) for O⊂R1, the optimal convergence order 1 in strong local sense is obtained.
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