CAM Seminar——High-Dimensional Partial Differential Equations, Optimal Control, and Deep Learning
主 题: CAM Seminar——High-Dimensional Partial Differential Equations, Optimal Control, and Deep Learning
报告人: Dr. Jiequn Han (Princeton University)
时 间: 2018-07-05 10:30-11:30
地 点: Room 1303, Sciences Building No. 1
Abstract: In the first part of talk, we will introduce a new approach based on deep learning, deep BSDE method, to solve general high-dimensional parabolic PDEs. To this end, the PDEs are reformulated using backward stochastic differential equations from a control perspective and the gradient of the unknown solution is approximated by neural networks. Numerical results of a variety of examples demonstrate that the proposed algorithm is quite effective in high-dimensions, in terms of both accuracy and speed. In the second part of talk, we will discuss the dynamical systems viewpoint of deep learning. In particular, learning is formulated as an optimal control problem, which takes into explicit account the compositional structure of deep neural networks. Based on this viewpoint, we will present a novel training algorithm as well as a concrete mathematical framework to study deep learning in terms of "mean-field optimal control", if time permits.