Variants of the Damascus inequality

Abstract

In 2016, Dannan and Sitnik established the notable Damascus inequality, which features a symmetric structure under a multiplicative constraint. In this study, we consider the natural generalisation of this inequality by characterising all positive integers m and n such that the inequality \[Σj=1mxjn-1xjn+1+1≤slant 0\] holds for any positive real numbers x1, …, xm with Πj=1mxj=1. Our approach relies on the theories of GA-convexity and Sturm's sequence. For the cases where the inequality fails, we also investigate the topological properties of the set of non-solutions.