Lower bound for cyclic sums with one-sided maximal averages in denominators

Abstract

Let x=(x1,…,xn) be an n-tuple of positive real numbers and the sequence (xi)i∈Z be its n-periodic extension. Given an n-tuple r=(r1,…,rn) of positive integers, let ai be the arithmetic mean of xi+1,…,xi+ri. We form the cyclic sums Sn(x,r)=Σi=1n xi/ai, following the pattern of the long studied Shapiro sums, which correspond to all ri=2, and more general Diananda sums, where all ri are equal. We find the asymptotics of the r-independent lower bounds An,*=∈fr∈fx Sn(x,r) as n∞: it is An,*=e n - A+O(1/ n).