Simultaneous Elements Of Prescribed Multiplicative Orders

Abstract

Let u 1, and v 1 be a pair of fixed relatively prime squarefree integers, and let d≥ 1, and e ≥1 be a pair of fixed integers. It is shown that there are infinitely many primes p≥ 2 such that u and v have simultaneous prescribed multiplicative orders ordpu=(p-1)/d and ordpv=(p-1)/e respectively, unconditionally. In particular, a squarefree odd integer u>2 and v=2 are simultaneous primitive roots and quadratic residues (or quadratic nonresidues) modulo p for infinitely many primes p, unconditionally.