The stochasticity parameter of quadratic residues

Abstract

Following V. I. Arnold, we define the stochasticity parameter S(U) of a subset U of Z/MZ to be the sum of squares of the consecutive distances between elements of U. In this paper we study the stochasticity parameter of the set RM of quadratic residues modulo M. We present a method which allows to find the asymptotics of S(RM) for a set of M of positive density. In particular, we obtain the following two corollaries. Denote by s(k)=s(k,Z/MZ) the average value of S(U) over all subsets U⊂eq Z/MZ of size k, which can be thought of as the stochasticity parameter of a random set of size k. Let S(RM)=S(RM)/s(|RM|). We show that a) M∞S(RM)<1<M∞S(RM); b) the set \ M∈ N: S(RM)<1 \ has positive lower density.