τ-tilting theory and silting theory of skew group algebra extensions
Abstract
Let be a finite dimensional algebra with an action by a finite group G and A:= *G the skew group algebra. One of our main results asserts that the canonical restriction-induction adjoint pair of the skew group algebra extension ⊂ A induces a poset isomorphism between the poset of G-stable support τ-tilting modules over and that of (\!\!\! G)-stable support τ-tilting modules over A. We also establish a similar poset isomorphism of posets of appropriate classes of silting complexes over and A. These two results generalize and unify preceding results by Huang-Zhang, Breaz-Marcus-Modoi and the second and the third authors. Moreover, we give a practical condition under which τ-tilting finiteness and silting discreteness of are inherited to those of A. As applications we study τ-tilting theory and silting theory of the (generalized) preprojective algebras and the folded mesh algebras. Among other things, we determine the posets of support τ-tilting modules and of silting complexes over preprojective algebra (Ln) of type Ln.
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