Computation of the classifying ring of formal groups with complex multiplication

A. Salch

Published 2015-11-12Version 1

Machinery is developed for computing the classifying ring $L^A$ of one-dimensional formal groups with complex multiplication by $A$, for a given commutative ring $A$. The machinery is then applied to compute $L^A$ for various number rings and cyclic group rings $A$. The ring $L^A$ has been computed, for certain choices of $A$, by M. Lazard, V. Drinfeld, and M. Hazewinkel, but in those cases $L^A$ is always isomorphic to a polynomial algebra. In the present paper, $L^A$ is computed in many cases in which it fails to be a polynomial algebra, leading to a qualitatively different moduli theory and a different presentation for the moduli stack of formal $A$-modules.