On Lower Bounds for sums of Fourier Coefficients of Twist-Inequivalent Newforms

Abstract

In this article, we address the lower bounds for the sums af(p)+ag(p) of the p-th Fourier coefficients of two twist-inequivalent, non-CM normalized newforms f and g. Our main result shows that for such forms with integer Fourier coefficients, the largest prime factor of af(p)+ag(p) satisfies P(af(p)+ag(p)) > ( p)1/14 ( p)3/7-ε for almost all primes p and for any ε > 0. Beyond primes, we apply Brun's sieve to show that a similar phenomenon holds for a set of positive integers with natural density one. The main result is further strengthened under the Generalized Riemann Hypothesis, where we establish exponential growth for the absolute value of af(p)+ag(p) in terms of p.Additionally, we derive an interesting result related to the multiplicity one theorem, demonstrating that if the sum af(p)+ag(p) is small for a positive-density subset of primes, then f and g must be twist-equivalent by a quadratic character.