On the least primitive root expressible as a sum of two squares

Abstract

For a positive integer n, a !-root modulo n is an integer q coprime to n which has maximal order in (Z/nZ) . We establish upper bounds for s (n), the least λ-root modulo n which is expressible as a sum of two squares, in particular proving that for ε > 0, and n large enough there always exists a λ -root q modulo n in the range 1 <= q <= n ½+ ε such that q is a sum of two squares.