# Minkowski问题及其Monge-Ampere方程天元研讨班（5.20-5.23）

本活动计划连续地用三到五年甚至更长的时间，瞄准Minkowskiw问题相关主流问题，以"学研"为出发点, 从凸几何、偏微分方程、质量输运三个专题基础开始, 在打好凸几何分析、Monge-Ampere方程理论、最优输运基础的同时向团队青年教师和研究生先容Minkowski问题相关热门问题，从而推动公海555000kk线路检测“偏微分方程与几何分析”团队的发展，加深国际同行特别是青年科研人员在该领域的合作研究。

These eventually lead to a family of Minkowski-type problem which characterize geometric measures related to convex bodies. Two problems that we are going to talk about are the classical Minkowski problem and the recently posed dual Minkowski problem (Huang-Lutwak-Yang-Zhang, Acta 2016). Minkowski problems link many fields of mathematics. In particular, in differential geometry, it is known as the problem of prescribing Gauss curvature; in PDE, it reduces to Monge-Ampere type equations. But, we shall discuss how these problems can be solved without any smoothness assumptions on the given data using calculus of variation.

This mini-lecture series is a gentle introduction to get the audience up-to-speed with the most recent research on Minkowski type problems, in particular the dual Minkowski problem which has received much attention in recent years.