τd-tilting theory for linear Nakayama algebras

Abstract

Support τ-tilting pairs, functorially finite torsion classes and 2-term silting complexes are three much studied concepts in the representation theory of finite-dimensional algebras, which moreover turn out to be connected via work of Adachi, Iyama and Reiten. We investigate their higher-dimensional analogues via τd-rigid pairs, d-torsion classes and (d+1)-term silting complexes as well as the connections between these three concepts. Our work is done in the setting of truncated linear Nakayama algebras (n,l)=k An/radk Anl admitting a d-cluster tilting module. More specifically, we classify τd-rigid pairs (M,P) of (n,l) with |M|+|P|=n via an explicit combinatorial description and show that they can be characterized by a certain maximality condition as well as by giving rise to a (d+1)-term silting complex in Kb(proj((n,l))). We also describe all d-torsion classes of (n,l). Finally, we compare our results to the classical case d=1 and investigate mutation with a special emphasis on the case where d equals the global dimension of .

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