TY - JOUR
T1 - Analysis of a Mixed Finite Element Method for Stochastic Cahn-Hilliard Equation with Multiplicative Noise
AU - Li , Yukun
AU - Prachniak , Corey
AU - Zhang , Yi
JO - Communications in Computational Physics
VL - 4
SP - 1003
EP - 1028
PY - 2024
DA - 2024/05
SN - 35
DO - http://doi.org/10.4208/cicp.OA-2023-0172
UR - https://global-sci.org/intro/article_detail/cicp/23092.html
KW - Stochastic Cahn-Hilliard equations, multiplicative noise, higher moment stability, strong convergence.
AB - <p style="text-align: justify;">This paper proposes and analyzes a novel fully discrete finite element scheme
with an interpolation operator for stochastic Cahn-Hilliard equations with functional-type noise. The nonlinear term satisfies a one-sided Lipschitz condition and the diffusion term is globally Lipschitz continuous. The novelties of this paper are threefold.
Firstly, the $L^2$-stability ($L^∞$ in time) and $H^2$-stability ($L^2$ in time) are proved for the
proposed scheme. The idea is to utilize the special structure of the matrix assembled by the nonlinear term. None of these stability results has been proved for the
fully implicit scheme in existing literature due to the difficulty arising from the interaction of the nonlinearity and the multiplicative noise. Secondly, higher moment
stability in $L^2$-norm of the discrete solution is established based on the previous stability results. Thirdly, the Hölder continuity in time for the strong solution is established under the minimum assumption of the strong solution. Based on these findings, the
strong convergence in $H^{−1}$-norm of the discrete solution is discussed. Several numerical experiments including stability and convergence are also presented to validate our
theoretical results.</p>