On the backward Euler approximation of the stochastic Allen-Cahn equation
Abstract
We consider the stochastic Allen-Cahn equation perturbed by smooth additive Gaussian noise in a spatial domain with smooth boundary in dimension d 3, and study the semidiscretization in time of the equation by an implicit Euler method. We show that the method converges pathwise with a rate O(Δtγ) for any γ<12. We also prove that the scheme converges uniformly in the strong Lp-sense but with no rate given.
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