Prime divisors of -Genocchi numbers and the ubiquity of Ramanujan-style congruences of level

Abstract

Let be any fixed prime number. We define the -Genocchi numbers by Gn:=(1-n)Bn, with Bn the n-th Bernoulli number. They are integers. We introduce and study a variant of Kummer's notion of regularity of primes. We say that an odd prime p is -Genocchi irregular if it divides at least one of the -Genocchi numbers G2,G4,…, Gp-3, and -regular otherwise. With the help of techniques used in the study of Artin's primitive root conjecture, we give asymptotic estimates for the number of -Genocchi irregular primes in a prescribed arithmetic progression in case is odd. The case =2 was already dealt with by Hu, Kim, Moree and Sha (2019). Using similar methods we study the prime factors of (1-n)B2n/2n and (1+n)B2n/2n. This allows us to estimate the number of primes p≤ x for which there exist modulo p Ramanujan-style congruences between the Fourier coefficients of an Eisenstein series and some cusp form of prime level .