Hecke polynomials for the mock modular form arising from the Delta-function

Abstract

We consider a mock modular form M(τ) that arises naturally from Ramanujan's Delta-function. It is a weight -10 harmonic Maass form whose nonholomorphic part is the "period integral function'' of (τ). The Hecke operator T-10(m) acts on this mock modular form in terms of Ramanujan's τ(m) and a monic degree m polynomial Fm(x), evaluated at x=j(τ). In analogy with results by Asai, Kaneko, and Ninomiya on the zeros of Hecke polynomials for the j-function, we prove that the zeros of each Fm(x), including x=0 and x=1728, are distinct and lie in [0, 1728]. Additionally, as m +∞, these zeros become equidistributed in [0, 1728].