Quadratic residues and related permutations

Abstract

Let p be an odd prime. For any p-adic integer a we let a denote the unique integer x with -p/2<x<p/2 and x-a divisible by p. In this paper we study some permutations involving quadratic residues modulo p. For instance, we consider the following three sequences. align* &A0: 12,\ 22,\ ·s,\ ((p-1)/2)2,\\ &A1: a1,\ a2,\ ·s,\ a(p-1)/2,\\ &A2: g2,\ g4,\ ·s,\ gp-1, align* where g∈ is a primitive root modulo p and 1 a1<a2<·s<a(p-1)/2 p-1 are all quadratic residues modulo p. Obviously Ai is a permutation of Aj and we call this permutation σi,j. Sun obtained the sign of σ0,1 when p 34. In this paper we give the sign of σ0,1 and determine the sign σ0,2 when p 1 4.