一周活动预告: 11.26-12.3
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Minimal quantile functions subject to stochastic dominance constraints (Xiangyu Wang)
From inverse coefficient problems to convex semidefinite optimization(Prof. Bastian von Harrach)
Optimal L² Error Estimates of Unconditionally Stable FE Schemes for the Cahn-Hilliard-Navier-Stokes System(王冀鲁)
Introduction to the obstacle problem (微信公众号:材料数学研究)
1. Minimal quantile functions subject to stochastic dominance constraints
报告人: Xiangyu Wang (Shenzhen Weiyan Technology Co., Ltd)
报告时间: 2023-11.29 10:00-11:00
报告链接: 腾讯会议ID: 140 716 796
信息来源:
http://www.amss.cas.cn/mzxsbg/202311/t20231123_6936997.html
报告摘要:
We consider a problem of finding an SSD (second-order stochastic dominance)-minimal quantile function subject to the mixture of FSD (first-order stochastic dominance) and SSD constraints. The SSD-minimal solution is explicitly worked out and has a close relation to the Skorokhod problem. This result is then applied to explicitly solve a risk minimizing problem in financial economics.
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2. From inverse coefficient problems to convex semidefinite optimization
3. Optimal L² Error Estimates of Unconditionally Stable FE Schemes for the Cahn-Hilliard-Navier-Stokes System
信息来源:
https://www.math.sdu.edu.cn/info/1020/19277.htm
4. Introduction to the obstacle problem
信息来源: 材料科学中的分析与计算系列短课
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