AR-Components of domestic finite group schemes: McKay-Quivers and Ramification

Abstract

For a domestic finite group scheme, we give a direct description of the Euclidean components in its Auslander-Reiten quiver via the McKay-quiver of a finite linearly reductive subgroup scheme of SL(2). Moreover, for a normal subgroup scheme N of a finite group scheme G, we show that there is a connection between the ramification indices of the restriction morphism P(VN)→P(VG) between their projectivized cohomological support varieties and the ranks of the tubes in their Auslander-Reiten quivers.