On a property of t-structures generated by non-classical tilting modules
Abstract
Let R be a ring and T ∈ Mod-R be a (non-classical) tilting module of finite projective dimension. Let T=( T≤0, T≥0) be the t-structure on D(R) generated by T and D=( D≤0, D≥0) be the natural t-structure. We show that the pair ( D, T) is right filterable in the sense of [FMT14], that is, for any i∈ Z the intersection D≥ i T≥ 0 is the co-aisle of a t-structure. As a consequence, the heart of T is derived equivalent to Mod-R.
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