Vanishing of (co)homology of Burch and related submodules

Abstract

We introduce the notion of Burch submodules and weakly m-full submodules of modules over local rings and study their properties. One of our main results shows that Burch submodules satisfy 2-Tor rigid and test property. We also show that over a local ring (R, m) a submodule M of a finitely generated R-module X, such that either M= m X or M(⊂eq m X) is weakly m-full in X, is 1-Tor rigid and a test module provided that X is faithful (and X/M has finite length when M is weakly m-full). As an application, we give a new class of rings such that a conjecture of Huneke and Wiegand is affirmative over them.