Sincere silting modules and vanishing conditions
Abstract
Let R be a perfect ring and T be an R-module. We study characterizations of sincere modules, sincere silting modules and tilting modules in terms of various vanishing conditions. It is proved that T is sincere silting if and only if T is presilting satisfing the vanishing condition KerExt0 i 1R(T,-)=0, and that T is tilting if and only if KerExt0≤slant i≤slant 1R(T,-)=0 and GenT⊂eq KerExt1≤slant i≤slant 2R(T,-). As an application, we prove that a sincere silting R-module T of finite projective dimension is tilting if and only if ExtiR(T,T(J))=0 for all sets J and all integer i 1. This not only extends a main result of Zhang [14]from finitely generated modules over Artin algebras to infinitely generated modules over more general rings, but also gives it a different proof without using the functor τ and Auslander-Reiten formula.
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