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A new class of stochastic exponential Runge-Kutta integrators for stochastic differential equations
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Reporter:
Guoguo Yang, Postdoctoral, Peking University
Inviter:
Yifa, Tang, Professor
Subject:
A new class of stochastic exponential Runge-Kutta integrators for stochastic differential equations
Time and place:
14:30-15:30 July 20(Wednesday), N702
Abstract:
In this work, we consider a new class of stochastic exponential Runge-Kutta (SERK) methods for solving stochastic differential equations. The proposed SERK methods can preserve conformal quadratic invariants and conformal symplectic structure automatically under certain coefficient conditions. Stochastic B-series theory is generalized, which allows the study of the mean-square convergence order conditions of the SERK methods. Some low stage stochastic exponential integrators with 1 order mean-square convergence and structure-preserving properties are given. For damped Hamiltonian systems with additive noise terms, a class of stochastic exponential integrators with 1.5 order mean-square convergence and conformal symplectic structure preservation is constructed. Numerical tests show the efficacy of the stochastic exponential integrators.