Tilting and silting theory of noetherian algebras

Abstract

We develop silting theory of a noetherian algebra over a commutative noetherian ring R. We study mutation theory of 2-term silting complexes of , and as a consequence, we see that mutation exists. As in the case of finite dimensional algebras, functorially finite torsion classes of bijectively correspond to silting -modules, if R is complete local. We show a reduction theorem of 2-term silting complexes of , and by using this theorem, we study torsion classes of the module category of . When R has Krull dimension one, we describe the set of torsion classes of explicitly by using the set of torsion classes of finite dimensional algebras.