Independence between coefficients of two modular forms

Abstract

Let k be an even integer and Sk be the space of cusp forms of weight k on 2(). Let S = k∈ 2 Sk. For f, g∈ S, we let R(f, g) = \ (af(p), ag(p)) ∈ P1()\ |\ p is a prime \ be the set of ratios of the Fourier coefficients of f and g, where af(n) (resp. ag(n)) is the nth Fourier coefficient of f (resp. g). In this paper, we prove that if f and g are nonzero and R(f,g) is finite, then f = cg for some constant c. This result is extended to the space of weakly holomorphic modular forms on 2(). We apply it to studying the number of representations of a positive integer by a quadratic form.