On the Analyticity of the group action on the Lubin-Tate space

Abstract

In this paper we study the analyticity of the group action of the automorphism group G of a formal module F of height 2 (defined over Fq) on the Lubin-Tate deformation space X of F. It is shown that a wide open congruence group of level zero attached to a non-split torus acts analytically on a particular disc in X on which the period morphism is not injective. For certain other discs with larger radii (defined in terms of quasi-canonical liftings) we find wide open rigid analytic groups which act analytically on these discs.