$$L_p$$ 双闵科夫斯基问题解的唯一性和连续性

IF 1.1 4区数学 Q1 MATHEMATICS

Communications in Mathematics and Statistics Pub Date : 2024-02-08 DOI:10.1007/s40304-023-00374-2

Hejun Wang, Jiazu Zhou

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引用次数: 0

摘要

Lutwak 等人（Adv Math 329:85-132, 2018）引入了 $L_p$ 对偶曲率度量，该度量统一了对偶布鲁恩-闵科夫斯基理论和布鲁恩-闵科夫斯基理论中的其他几个几何度量。受卢特瓦克等人的研究（Adv Math 329:85-132，2018）的启发，我们考虑了 $L_p$ 对偶闵科夫斯基问题解的唯一性和连续性。为了将 LYZ 的重要工作（定理 A）扩展到一般凸体的情况，我们建立了一些新的 Minkowski 型不等式，这些不等式与 $L_p$ 对偶 Minkowski 问题相关的优化问题密切相关。当 $q< p$ 时，得到了一般凸体的 $L_p$ 对偶 Minkowski 问题解的唯一性。此外，我们还得到了凸体的$L_p$ dual Minkowski 问题解的连续性。

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Uniqueness and Continuity of the Solution to $$L_p$$ Dual Minkowski Problem

Lutwak et al. (Adv Math 329:85–132, 2018) introduced the $L_p$ dual curvature measure that unifies several other geometric measures in dual Brunn–Minkowski theory and Brunn–Minkowski theory. Motivated by works in Lutwak et al. (Adv Math 329:85–132, 2018), we consider the uniqueness and continuity of the solution to the $L_p$ dual Minkowski problem. To extend the important work (Theorem A) of LYZ to the case for general convex bodies, we establish some new Minkowski-type inequalities which are closely related to the optimization problem associated with the $L_p$ dual Minkowski problem. When $q< p$, the uniqueness of the solution to the $L_p$ dual Minkowski problem for general convex bodies is obtained. Moreover, we obtain the continuity of the solution to the $L_p$ dual Minkowski problem for convex bodies.

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来源期刊

Communications in Mathematics and Statistics Mathematics-Statistics and Probability

CiteScore

1.80

自引率

0.00%

发文量

期刊介绍： Communications in Mathematics and Statistics is an international journal published by Springer-Verlag in collaboration with the School of Mathematical Sciences, University of Science and Technology of China (USTC). The journal will be committed to publish high level original peer reviewed research papers in various areas of mathematical sciences, including pure mathematics, applied mathematics, computational mathematics, and probability and statistics. Typically one volume is published each year, and each volume consists of four issues.