Polynomial interpolation of modular forms for Hecke groups

Abstract

Extending work of J. Raleigh, we compute polynomials Pn,F(x) associated to certain families F = \fm\m = 3, 4, ... of modular forms for Hecke groups G(λm) with the property that Pn,F(m) is the nth coefficient in the Fourier expansion of fm. We express the Pn,F in terms of the Fourier expansions of well-known Hauptmoduln, or in terms of certain divisor-sums. By studying the complex roots of the Pn, we relate them to Lehmer's question about Ramanujan's tau function. We review the theory of triangle functions and Hecke's theory of modular forms in order to establish a basis for our code, some of which originates in the dissertation of J. Leo. The article is an account of numerical experiments; the only theorems in it belong to work by others that we review as described above.