Cartan maps and projective modules

Abstract

Let R be a commutative ring, π be a finite group, Rπ be the group ring of π over R. Theorem 1. If R is a commutative artinian ring and π is a finite group. Then the Cartan map c:K0(Rπ) G0(Rπ) is injective. Theorem 2. Suppose that R is a Dedekind domain with charR=p>0 and π is a p-group. Then every finitely generated projective Rπ-module is isomorphic to F A where F is a free module and A is a projective ideal of Rπ. Moreover, R is a principal ideal domain if and only if every finitely generated projective Rπ-module is isomorphic to a free module. Theorem 3. Let R be a commutative noetherian ring with total quotient ring K, A be an R-algebra which is a finitely generated R-projective module. Suppose that I is an ideal of R such that R/I is artinian. Let \M1,…,Mn\ be the set of all maximal ideals of R containing I. Assume that the Cartan map ci: K0(A/MiA) G0(A/MiA) is injective for all 1 i n. If P and Q are finitely generated A-projective modules with KP KQ, then P/IP Q/IQ.