On the number of prime divisors and radicals of non-zero Fourier coefficients of Hilbert cusp forms

Abstract

In this article, we derive lower bounds for the number of distinct prime divisors of families of non-zero Fourier coefficients of non-CM primitive cusp forms and more generally of non-CM primitive Hilbert cusp forms. In particular, for the Ramanujan -function, we show that for any ε > 0, there exist infinitely many natural numbers n such that τ(pn) has at least 2(1-ε) n n distinct prime factors for almost all primes p. This improves and refines the existing bounds. We also study lower bounds for absolute norms of radicals of non-zero Fourier coefficients of Modular forms alluded to above.