On the geometry of lattices and finiteness of Picard groups

Abstract

Let (K, O, k) be a p-modular system with k algebraically closed and O unramified, and let be an O-order in a separable K-algebra. We call a -lattice L rigid if Ext1(L,L)=0, in analogy with the definition of rigid modules over a finite-dimensional algebra. By partitioning the -lattices of a given dimension into "varieties of lattices", we show that there are only finitely many rigid -lattices L of any given dimension. As a consequence we show that if the first Hochschild cohomology of vanishes, then the Picard group and the outer automorphism group of are finite. In particular the Picard groups of blocks of finite groups defined over O are always finite.