Affiliation:
1. School of Mathematics and Statistics Shandong Normal University Jinan China
2. Department of Mathematics, SUSTech International Center for Mathematics & National Center for Applied Mathematics Shenzhen (NCAMS) Southern University of Science and Technology Shenzhen China
3. Guangdong Provincial Key Laboratory of Interdisciplinary Research and Application for Data Science & Department of Mathematical Sciences BNU‐HKBU United International College Zhuhai China
Abstract
AbstractIn this paper, we investigate the nonlocal‐in‐time Allen‐Cahn equation (NiTACE), which incorporates a nonlocal operator in time with a finite nonlocal memory. Our objective is to examine the well‐posedness of the NiTACE by establishing the maximal regularity for the nonlocal‐in‐time parabolic equations with fractional power kernels. Furthermore, we derive a uniform energy bound by leveraging the positive definite property of kernel functions. We also develop an energy‐stable time stepping scheme specifically designed for the NiTACE. Additionally, we analyze the discrete maximum principle and energy dissipation law, which hold significant importance for phase field models. To ensure convergence, we verify the asymptotic compatibility of the proposed stable scheme. Lastly, we provide several numerical examples to illustrate the accuracy and effectiveness of our method.
Funder
National Natural Science Foundation of China
Natural Science Foundation of Shandong Province