The maximal order of the shifted-prime divisor function
Abstract
For each positive integer n, we denote by ω*(n) the number of shifted-prime divisors p-1 of n, i.e., \[ω*(n):=Σp-1 n1.\] First introduced by Prachar in 1955, this function has interesting applications in primality testing and bears a strong connection with counting Carmichael numbers. Prachar showed that for a certain constant c0 > 0, \[ω*(n)>(c0 n( n)2)\] for infinitely many n. This result was later improved by Adleman, Pomerance and Rumely, who established an inequality of the same shape with ( n)2 replaced by n. Assuming the Generalized Riemann Hypothesis for Dirichlet L-functions, Prachar also proved the stronger inequality \[ω*(n)>((122+o(1)) n n)\] for infinitely many n. By refining the arguments of Prachar and of Adleman, Pomerance and Rumely, we improve on their results by establishing align* ω*(n)&>(0.6736 2· n n) (unconditionally),\\ ω*(n)&>(((1+52)+o(1)) n n) (under GRH), align* for infinitely many n.
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