报告题目: Some existence results for Minkowski type problems
报告人: 鲁建 研究员(华南师范大学)
时间: 2023/5/8 ( 周一 ) 15:00-16:00
地点: 数学院 425 #
邀请人: 黄勇
摘要:Some Minkowski type problems arise from modern convex geometry. In the smooth case, they are usually equivalent to solving a class of Monge-Ampere type equations defined on the unit hypersphere. These equations could be degenerate or singular in different conditions. We will talk about some recent new existence results for the Orlicz-Minkowski problem and its dual problem.
报告人简介:鲁建,2013年在清华大学获博士学位,现为华南师范大学研究员。研究方向主要为偏微分方程,特别是Monge-Ampere型方程及其在几何中的应用。
在数学学术期刊 Adv. Math., Calc. Var. PDE, J. Funct. Anal., Trans. AMS,等主流期刊上发表研究论文十余篇。主持国家自然科学基金优秀青年科学基金项目、面上项目等课题。
