报告题目: Polynomial convergence rate to nonequilibrium steady-state
报告人: Yao Li, University of Massachusetts Amherst
时间:12月27日(周二)下午4:00-5:00
地点:管研楼1208教室
摘要: In this talk I will present my recent result about the ergodic properties of nonequilibrium steady-state (NESS) for a stochastic energy exchange model. The energy exchange model is numerically reduced from a billiards-like deterministic particle system that models the microscopic heat conduction in a 1D chain. By using a technique called the induced chain method, I proved the existence, uniqueness, polynomial speed of convergence to the NESS, and polynomial speed of mixing for the stochastic energy exchange model. All of these are consistent with the numerical simulation results of the original deterministic billiards-like system.
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