SPLITTING SCHEMES FOR FITZHUGH-NAGUMO STOCHASTIC PARTIAL DIFFERENTIAL EQUATIONS
Journal article, 2024
. We design and study splitting integrators for the temporal discretization of the stochastic FitzHugh-Nagumo system. This system is a model for signal propagation in nerve cells where the voltage variable is the solution of a one-dimensional parabolic PDE with a cubic nonlinearity driven by additive space-time white noise. We first show that the numerical solutions have finite moments. We then prove that the splitting schemes have, at least, the strong rate of convergence 1/4. Finally, numerical experiments illustrating the performance of the splitting schemes are provided.
stochastic partial differential equations
FitzHugh-Nagumo equation
strong error estimates
splitting schemes
Author
Charles-Edouard Brehier
Universite de Pau et des Pays de L'Adour
David Cohen
University of Gothenburg
Giuseppe Giordano
University of Salerno
Discrete and Continuous Dynamical Systems - Series B
1531-3492 (ISSN)
Vol. 29 1 214-244Numerical analysis and simulation of PDEs with random dispersion
Swedish Research Council (VR) (2018-04443), 2019-01-01 -- 2022-12-31.
Subject Categories
Computational Mathematics
Probability Theory and Statistics
Signal Processing
DOI
10.3934/dcdsb.2023094