Twists by Dirichlet characters and polynomial Euler products of L-functions, II

Abstract

In a previous paper we proved that if an L-function F from the Selberg class has degree 2, its conductor qF is a prime number and F is weakly twist-regular at all primes p≠ qF, then F has a polynomial Euler product. In this paper we extend this result to L-functions of degree 2 with square-free conductor qF, which are weakly twist-regular at all primes p qF