Vector-Valued Maclaurin Inequalities

Silouanos Brazitikos; Finlay McIntyre

arXiv:2102.05900·math.MG·February 12, 2021

Vector-Valued Maclaurin Inequalities

Silouanos Brazitikos, Finlay McIntyre

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TL;DR

This paper explores a vector version of Maclaurin inequalities and links it to an Aleksandrov-type inequality for parallelepipeds, advancing geometric inequality theory.

Contribution

It introduces a novel vector-valued Maclaurin inequality and establishes its connection to parallelepiped inequalities, providing new insights in geometric analysis.

Findings

01

Established a vector-valued Maclaurin inequality.

02

Connected the inequality to Aleksandrov-type inequalities for parallelepipeds.

03

Contributed to the theory of geometric inequalities.

Abstract

We investigate a Maclaurin inequality for vectors and its connection to an Aleksandrov-type inequality for parallelepipeds.

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