Improved uniform error bounds on numerical methods for long-time dynamics of nonlinear Schrodinger equation
报告题目:Improved uniform error bounds on numerical methods for long-time dynamics of nonlinear Schrodinger equation
报告人:冯悦,西安交通大学
报告时间:2026年4月29日(周三),9:30-12:30
报告地点:长安大学理学院楼308
报告摘要:In this talk, I will introduce the long-time problem for the nonlinear Schrodinger equation (NLSE) with weak nonlinearity, which is characterized by
with
a dimensionless parameter. We solve the NLSE using various temporal discretization, including finite difference methods, exponential integrators and time-splitting methods combined with different spatial discretization. By introducing a new technique--Regularity Compensation Oscillation (RCO) which controls the high frequency modes by the regularity of the exact solution and analyzes the low frequency modes by phase cancellation and energy method, we carry out the improved uniform error bounds for the time-splitting Fourier pseudospectral method. In addition, we design new exponential integrators for the low-regularity initial data and extend this result to other dispersive PDEs.
报告人简介:冯悦,西安交通大学数学与统计学院教授,博士生导师,入选国家高层次青年人才计划,西安交通大学“青年拔尖人才支持计划A类”。冯悦博士于2014年和2017年在浙江大学取得学士和硕士学位,于2020年在新加坡国立大学取得博士学位,随后在新加坡国立大学及法国索邦大学从事博士后研究,2023年12月入职西安交通大学数学与统计学院。冯悦博士致力于色散类偏微分方程数值求解方法及分析方面的研究,主要关注长时间动力学和高振荡问题的算法设计及误差估计,相关工作发表在SIAM J. Numer. Anal., Math. Comp., Numer. Math.等计算数学权威期刊上。
