Comparison of Gini means with fixed number of variables

Abstract

In this paper, we consider the global comparison problem of Gini means with fixed number of variables on a subinterval I of R+, i.e., the following inequality alignggcabs Gr,s[n](x1,…,xn) ≤ Gp,q[n](x1,…,xn), align where n∈N,n≥2 is fixed, (p,q),(r,s)∈R2 and x1,…,xn∈ I. Given a nonempty subinterval I of R+ and n∈N, we introduce the relations \[ n(I):=\((r,s),(p,q))∈R2×R2 ggcabs holds for all x1,…,xn∈ I\, ∞(I):=n=1∞n(I). \] In the paper, we investigate the properties of these sets and their dependence on n and on the interval I and we establish a characterizations of these sets via a constrained minimum problem by using a variant of the Lagrange multiplier rule. We also formulate two open problems at the end of the paper.