Explicit constants in averages involving the multiplicative order

Abstract

Let a>1. Denote by la(p) the multiplicative order of a modulo p. We look for an estimate of sum of la(p)p-1 over primes p≤ x on average. When we average over a≤ N, we observe a statistic of CLi(x). P. J. Stephens ~[Theorem 1]S proved this statistic for N>(c1 x) for some positive constant c1. Upon this result, we give an explicit value of c1. In fact, ~[Theorem 1, 3]S hold with N>(3.42 x), and ~[Theorem 2, 4]S hold with N>(4.8365 x). Also, we improve the range of y, from y≥ ((2+ε) x x) in ~[Theorem 1]LP, to y > (3.42 x).