Dynamical Combinatorics and Torsion Classes (1911.10712v2)

Abstract: For finite semidistributive lattices the map $\kappa$ gives a bijection between the sets of completely join-irreducible elements and completely meet-irreducible elements. Here we study the $\kappa$-map in the context of torsion classes. It is well-known that the lattice of torsion classes for an artin algebra is semidistributive, but in general it is far from finite. We show the $\kappa$-map is well-defined on the set of completely join-irreducible elements, even when the lattice of torsion classes is infinite. We then extend $\kappa$ to a map on torsion classes which have canonical join representations given by the special torsion classes associated to the minimal extending modules introduced by the first and third authors and A. Carroll. For hereditary algebras, we show that the extended $\kappa$-map on torsion classes is essentially the same as Ringel's $\epsilon$-map on wide subcategories. Also in hereditary case, we relate the square of $\kappa$ to the Auslander-Reiten translation.