For a finite quiver Q, we study the reachability category ReachQ. We in-vestigate the properties of ReachQ from both a categorical and a topological viewpoint. In particular, we compare ReachQ with PathQ, the category freely generated by Q. As a first application, we study the category algebra of ReachQ, which is isomorphic to the commuting algebra of Q. As a consequence, we recover, in a categorical framework, previous results obtained by Green and Schroll; we show that the commuting algebra of Q is Morita equivalent to the incidence algebra of a poset, the reachability poset. We further show that commuting algebras are Morita equivalent if and only if the reacha-bility posets are isomorphic. As a second application, we define persistent Hochschild homology of quivers via reachability categories.
Caputi, L., Riihimaki, H. (2024). ON REACHABILITY CATEGORIES, PERSISTENCE, AND COMMUTING ALGEBRAS OF QUIVERS. THEORY AND APPLICATIONS OF CATEGORIES, 41, 426-448.
ON REACHABILITY CATEGORIES, PERSISTENCE, AND COMMUTING ALGEBRAS OF QUIVERS
Caputi L.;
2024
Abstract
For a finite quiver Q, we study the reachability category ReachQ. We in-vestigate the properties of ReachQ from both a categorical and a topological viewpoint. In particular, we compare ReachQ with PathQ, the category freely generated by Q. As a first application, we study the category algebra of ReachQ, which is isomorphic to the commuting algebra of Q. As a consequence, we recover, in a categorical framework, previous results obtained by Green and Schroll; we show that the commuting algebra of Q is Morita equivalent to the incidence algebra of a poset, the reachability poset. We further show that commuting algebras are Morita equivalent if and only if the reacha-bility posets are isomorphic. As a second application, we define persistent Hochschild homology of quivers via reachability categories.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
