相对Alexandrov-Fenchel型不等式

Alexandrov-Fenchel不等式是凸几何中的重要不等式之一,它的特殊形式可以看作是高阶均质积分之间的等周型不等式.近年来,带自由边界或毛细边界超曲面获得了很多关注.本文从微分几何角度研究球体内或半空间中带有自由边界或毛细边界凸超曲面上的一类相对Alexandrov-Fenchel型不等式,并综述它的最新进展.首先,介绍单位球体或半空间中毛细边界超曲面的高阶Minkowski型积分公式.从第一变分角度给出单位球体或半空间中毛细边界超曲面的均质积分的定义.然后,本文利用Minkowski型公式构造局部限制型的超曲面曲率流,通过分析流的长时间存在性和收敛性,证明单位球体和半空间中的一类相对Alexandrov-Fenchel型不等式.

双曲空间上的Alexandrov-Fenchel不等式

本文在双曲空间H^n(n≥5)中建立如下的双曲Alexandrov-Fenchel不等式:若超曲面为h-凸的,则有∫∑σ_4dμ≥C_(n-1)~4w_(n-1){(|Σ|/w_(n-1))~1/2)+(|Σ|/w_(n-1))^((1/2)(n-5)/(n-1)}~2等号成立当且仅当Σ为H^n中的测地球面.

Gauss-Bonnet-Chern mass and Alexandrov-Fenchel inequality

This is a survey about our recent works on the Gauss-Bonnet-Chern （GBC） mass for asymptotically flat and asymptotically hyperbolic manifolds. We first introduce the GBC mass, a higher order mass, for asymptotically flat and for asymptotically hyperbolic manifolds, respectively, by using a higher order scalar curvature. Then we prove its positivity and the Penrose inequality for graphical manifolds. One of the crucial steps in the proof of the Penrose inequality is the use of an Alexandrov-Fenchel inequality, which is a classical^inequality in the Euclidean space. In the hyperbolic space, we have established this new Alexandrov-Fenchel inequality. We also have a similar work for asymptotically locally hyperbolic manifolds. At the end, we discuss the relation between the GBC mass and Chern＇s magic form.