A Note on the Degree of Field Extensions Involving Classical and Nonholomorphic Singular Moduli

Abstract

In their 2015 paper, Mertens and Rolen prove that for a certain level 6 "almost holomorphic" modular function P, the degree of P(τ) over Q for quadratic τ is as large as expected, settling a conjecture of Bruinier and Ono. Analogously for level 1 modular functions f, we expect Q(f(τ)) to have similar degree to Q(j(τ)). In this paper, I show for a wide class of level 1 almost holomorphic modular functions that \[1M[Q(j(τ)):Q]≤ [Q(f(τ)):Q]≤[Q(j(τ)):Q]\] for all quadratic τ and some constant M. This is proven using techniques of o-minimality, and hence can easily be made uniform; the constant M depends only upon the "degree" of f (in a certain well-defined sense).