Invertible Lattices

Abstract

Theorem. Let π be a finite group of order n, R be a Dedekind domain satisfying that (i) charR=0, (ii) every prime divisor of n is not invertible in R, and (iii) p is unramified in R for any prime divisor p of n. Then all the flabby (resp.\ coflabby) Rπ-lattices are invertible if and only if all the Sylow subgroups of π are cyclic. The above theorem was proved by Endo and Miyata when R=Z [Theorem 1.5]EM. As applications of this theorem, we give a short proof and a partial generalization of a result of Torrecillas and Weigel [Theorem A]TW, which was proved using cohomological Mackey functors.