报告人：李哲骅博士后      

        上海纽约大学

题目: A glance at stochastic differential geometry from Brownian motion on Riemannian manifolds

时间：2019年3月13日15:30-16:30

地点：实验楼105

摘要:

Brownian motion, or more generally semi-martingale on manifolds has been playing a central role in stochastic differential geometry. In this expository talk I will use Brownian motion as a starting point and main example to overview the development of stochastic differential geometry in the last 40 years. We will include several interesting topics like Malliavin calculus, log Sobolev inequalities, index theorem and so on.

报告人简介：

李哲骅在加州大学圣迭戈分校获博士学位，在上海纽约大学数学研究所从事博士后工作。研究兴趣为随机分析和黎曼几何。