Cumulative Riemann sums, distribution functions, and a universal inequality

Abstract

We study discrete expressions of the form Tn(g)=Σi=1n ai g(Si), Si=Σj=1i aj, where ai>0 and Σi=1n ai=1. If g:[0,1] is a decreasing integrable function, we have Σi=1n ai g(Si) ∫01 g(x)\,dx, from which classical inequalities can be obtained, for instance for the choice g(x)=1-xk. Although elementary, this inequality admits a natural interpretation in terms of Riemann sums, Abel summation, and the probability integral transform. The aim of this paper is to present a unified perspective emphasizing that the discrete inequality is a consequence of a distribution-free continuous identity. Beyond the specific example, we establish a general discrete theorem for monotone functions and discuss connections with majorization theory and Karamata's inequality.

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