Finite subgroups of extended Morava stabilizer groups

Abstract

The problem addressed is the classification up to conjugation of the finite subgroups of the (classical) Morava stabilizer group Sn and the extended Morava stabilizer group Gn(u) associated to a formal group law F of height n over the field Fp of p elements. A complete classification in Sn is provided for any n and p. Furthermore, we show that the classification in the extended group also depends on F and its associated unit u in the ring of p-adic integers. We provide a theoretical framework for the classification in Gn(u), we give necessary and sufficient conditions on n, p and u for the existence in Gn(u) of extensions of maximal finite subgroups of Sn by the Galois group Gal(Fpn/Fp), and whenever such extension exist we enumerate their conjugacy classes. We illustrate our methods by providing a complete and explicit classification in the case n=2.