The reciprocal sum of divisors of Mersenne numbers

Abstract

We investigate various questions concerning the reciprocal sum of divisors, or prime divisors, of the Mersenne numbers 2n-1. Conditional on the Elliott-Halberstam Conjecture and the Generalized Riemann Hypothesis, we determine n x Σp 2n-1 1/p to within o(1) and n x Σd 2n-11/d to within a factor of 1+o(1), as x∞. This refines, conditionally, earlier estimates of Erdos and Erdos-Kiss-Pomerance. Conditionally (only) on GRH, we also determine Σ 1/d to within a factor of 1+o(1) where d runs over all numbers dividing 2n-1 for some n x. This conditionally confirms a conjecture of Pomerance and answers a question of Murty-Rosen-Silverman. Finally, we show that both Σp 2n-1 1/p and Σd 2n-11/d admit continuous distribution functions in the sense of probabilistic number theory.