Lp Brunn-Minkowski型仿射均质积分不等式

经典的仿射均质积分不等式是Brunn-Minkowski理论中一个关键不等式.建立了L_p Brunn-Minkowski型仿射均质积分不等式,定义了L_p Brunn-Minkowski型仿射混合均质积分且推广得到了L_p Brunn-Minkowski型仿射混合均质积分不等式.     

Dual kinematic formulas

We establish kinematic formulas for dual quermassintegrals of star bodies and for chord power integrals of convex bodies by using dual mixed volumes. These formulas are extensions of the fundamental kinematic formula involving quermassintegrals to the cases of dual quermassintegrals and chord power integrals. Applications to geometric probability are considered.

     

LOOMIS-WHITNEY＇S INEQUALITY ABOUT MIXED BODY

In this article, the authors establish two theorems for mixed body, which are the generalizations of the well-known Loomis-Whitney＇s inequality.     

LOOMIS-WHITNEY'S INEQUALITY ABOUT MIXED BODY

In this article,the authors establish two theorems for mixed body,which are the generalizations of the well-known Loomis-Whitney's inequality.     

Inequalities for polars of mixed projection bodies

In 1993 Lutwak established some analogs of the Brunn-Minkowsi inequality and the Aleksandrov-Fenchel inequality for mixed projection bodies. In this paper, following Lutwak, we give their polars forms. Further, as applications of our methods, we give a generalization of Pythagorean inequality for mixed volumes.     

平移积分几何中的对偶运动公式

本文利用对偶混合体积建立平移积分几何中的对偶运动公式.这些公式是将关于均质积分的基本运动公式推广到对偶均质积分和对偶混合体积情形.     

一般对偶混合体积不等式(英文)

本文研究了星体的对偶仿射均质积分问题.利用H(o)lder不等式和Blaschke-Santaló不等式.获得了一般对偶均质积分的Minkowski不等式,Brunn-Minkowski不等式以及定理3.从而不等式推广了文献[7]的结果.     

Bodies with similar projections

Aleksandrov's projection theorem characterizes centrally symmetric convex bodies by the measures of their orthogonal projections on lower dimensional subspaces. A general result proved here concerning the mixed volumes of projections of a collection of convex bodies has the following corollary. If is a convex body in whose projections on -dimensional subspaces have the same -dimensional volume as the projections of a centrally symmetric convex body , then the Quermassintegrals satisfy , for , with equality, for any , if and only if is a translate of . The case where is centrally symmetric gives Aleksandrov's projection theorem.

     

A Circumradius-Inradius Identity and an Identity Relating Volumes for a Simplex

We establish an identity for an n-dimensional simplex relating the circumradius and the inradius, and an identity relating its volume and the pedal volume. As applications, we derive some known inequalities for simplices and generalizations of such inequalities.     

平坦外平行体的平均曲率积分的均值(英文)

本文研究了Rn中平坦的外平行体的平均曲率积分.利用积分几何的方法和凸体理论的相关知识,得到了这些平均曲率积分的均值.作为推论,我们得到了这些平均曲率积分所对应的均质积分的均值.     

涉及两个单形的几何不等式

本文建立了涉及两个单形一个几何不等式,并应用它得到单形的一些几何不等式。     

On the L p -dual mixed volumes

We establish the cyclic inequality for i-th L p-dual mixed volume and Lp-dual Urysohn inequality between p-mean width and Lp-dual quermassintegral. Moreover, the dual isoperimetric inequality for Lp-dual mixed volume is proved, which is an extension of the classical dual isoperimetric inequality.     

Inequalities for Mean Circumscribing Simplices

The aim of this note is to strengthen and generalize an inequality of Sangwine–Yager regarding means of various quantities associated with the simplices circumscribing a convex body.     

运动星体内部径向方向上两点间的平均距离

本文研究了两个相交非空凸体的交集及其线性径向组合体内部两点间的平均距离问题.利用对偶均质积分和对偶混合体积两个工具, 获得了平均距离的计算公式, 推广了已有的对偶运动公式的相关结果.     

SOME DUAL KINEMATIC FORMULAS

In this article, some kinematic formulas for dual quermassintegral of star bodies and for chord power integrals of convex bodies are established by using dual mixed volumes. These formulas are the extensions of the fundamental kinematic formula involving quermassintegral to the case of dual quermassintegral and chord power integrals.     

运动星体内部径向方向上两点间的平均距离

本文研究了两个相交非空凸体的交集及其线性径向组合体内部两点间的平均距离问题.利用对偶均质积分和对偶混合体积两个工具,获得了平均距离的计算公式,推广了已有的对偶运动公式的相关结果.     

The Brunn–Minkowski Inequality and Nonconvex Sets

We improve the Brunn–Minkowski inequality for nonconvex sets. Besides the volume of the sets, our estimate depends on the volume of the convex hull of one of the sets. The estimate is asymptotically the best possible if this set is fixed and the size of the other tends to infinity.     

Some Inequalities for the General Radial Bo dies

Lutwak showed the radial bodies combining with the radial Minkowski linear combinations of star bodies. In this paper, the general radial bodies are introduced and its some properties and inequalities are established.     

外平行凸体的平均值

本文研究了外平行凸体Kρ在任意(n-r)维平面上的正交投影( Kρ)′n-r,利用K的均质积分,得到了( Kρ)′n-r的面积平均值,体积平均值以及平均曲率的任意阶积分的平均值.     

Dual mixed Orlicz–Brunn–Minkowski inequality and dual Orlicz mixed quermassintegrals

The dual Orlicz–Brunn–Minkowski inequality is extended from volume to dual quermassintegrals. As application, a dual mixed log-Brunn–Minkowski inequality is obtained. Moreover, dual Orlicz mixed quermassintegrals are defined and a dual Orlicz–Minkowski inequality and a dual mixed log-Minkowski inequality are established.