Invariants of Linkage of modules

Abstract

Let (A,m) be a Gorenstein local ring and let M, N be two Cohen-Macaulay \ A-modules with M linked to N via a Gorenstein ideal q. Let L be another finitely generated A-module. We show that ExtiA(L,M) = 0 for all i 0 if and only if TorAi(L,N) = 0 for all i 0. If D is Cohen-Macaulay then we show that ExtiA(M, D) = 0 for all i 0 if and only if ExtiA(D, N) = 0 for all i 0, where D = ExtrA(D,A) and r = codim \ D. As a consequence we get that ExtiA(M, M) = 0 for all i 0 if and only if ExtiA(N, N) = 0 for all i 0. We also show that EndA(M)/rad \ EndA(M) (EndA(N)/rad \ EndA(N))op. We also give a negative answer to a question of Martsinkovsky and Strooker.