Consecutive non-square non-primitive pairs in a finite field

Abstract

Let q be an odd prime power and write \[ θq := φ(q-1)q-1. \] If θq < 13, or if θq = 13 and q \7,13,19,25,37\, then the finite field contains a pair of consecutive elements that are both non-square and non-primitive. This extends a result of Jarso and Trudgian for prime fields , where the same conclusion was obtained under the stronger condition θp 14. More generally, let be the least odd prime divisor of q-1. If θq 13, then contains a pair of consecutive elements that are non-squares and powers, with the sole exceptions q ∈ \7,13,19,25,37,43\.