Generalized modular equations and the CM values of Hauptmoduln

Abstract

Monstrous moonshine relates the representation of the Monster finite sporadic simple group to the distinguished modular functions, called Hauptmoduln. Chen-Yui~Chen-Yui showed that the CM values of Hauptmoduln which appeare in monstrous moonshine (but not all) are algebraic integers, which is similar to the singular moduli of the j-function. In this paper, we generalize this result to Hauptmoduln whose q-coefficients are cyclotomic integers. A main idea for our proof is the use of generalized modular equations for Hauptmoduln, which was introduced by Cummins-Gannon~Cummins-Gannon in the study of monstrous moonshine. As an application, we show that if a formal q-series satisfies the special combinatoric property called complete replicability, its CM values are algebraic integers, without assuming the modular invariance.