国家天元数学中部中心随机分析Colloquium系列报告 | 李娟 教授(山东大学)

发布时间: 2022-12-06 16:59

报告题目:Mean Field Stochastic Control under Sublinear Expectation

报告时间:2022-12-16  16:30 - 17:30

报告人:李娟 教授  山东大学

腾讯会议ID:980 459 070

Abstract:In this talk we study Pontryagin's stochastic maximum principle for a mean-field optimal control problem under Peng's G-expectation. The dynamics of the controlled state process is given by a stochastic differential equation driven by a G-Brownian motion, whose coefficients depend not only on the control, the controlled state process but also on its law under the G-expectation. Also the associated cost functional is of mean-field type. Under the assumption of a convex control state space we study the stochastic maximum principle, which gives a necessary optimality condition for control processes. Under additional convexity assumptions on the Hamiltonian it is shown that this necessary condition is also a sufficient one. The main difficulty which we have to overcome in our work consists in the differentiation of the G-expectation of parameterized random variables. 

Based on joint work with Rainer Buckdahn (UBO, France), Bowen He (SDU, China).