报告题目:Energy Stability and Convergence of the SAV Finite Difference Methods for Gradient Flows
报告人:李晓丽 厦门大学
报告摘要:In this talk, we shall first present construction and analysis of a block-centered finite difference method for the spatial discretization of the scalar auxiliary variable Crank-Nicolson scheme (SAV/CN-BCFD) for gradient flows, and show rigorously that scheme is second-order in both time and space in various discrete norms. When equipped with an adaptive time strategy, the SAV/CN-BCFD scheme is accurate and extremely efficient. Then we will discuss how to construct a numerical scheme based on the SAV approach in time and the MAC discretization in space for the Cahn-Hilliard-Navier-Stokes phase field model, and carry out stability and error analysis. Finally the numerical simulations are demonstrated the robustness and accuracy of our scheme.
报告人简介:李晓丽,厦门大学博士后,合作导师沈捷教授。2018年12月山东大学博士毕业,主要研究领域为偏微分方程数值解与计算流体力学,已在SIAM J. Numer. Anal., Math. Comput., Comput. Methods Appl. Mech. Engrg.等计算数学高水平期刊上发表学术论文30余篇。获得中国⼯业与应用数学学会第16届年会优秀学生论文奖,山东省研究生优秀科技成果二等奖。2019年入选“博士后创新人才支持计划”,获国家自然科学青年基金以及第65批中国博士后科学基金一等资助。
报告邀请人:周兆杰
报告时间:2019年10月11日(周五) 09:00-10:00
报告地点:长清湖校区A区231
欢迎各位老师和同学参加!