Homological algebra of Nakayama algebras and 321-avoiding permutations

Abstract

Linear Nakayama algebras over a field K are in natural bijection to Dyck paths and Dyck paths are in natural bijection to 321-avoiding bijections via the Billey-Jockusch-Stanley bijection. Thus to every 321-avoiding permutation π we can associate in a natural way a linear Nakayama algebra Aπ. We give a homological interpretation of the fixed points statistic of 321-avoiding permutations using Nakayama algebras with a linear quiver. We furthermore show that the space of self-extension for the Jacobson radical of a linear Nakayama algebra Aπ is isomorphic to Ks(π), where s(π) is defined as the cardinality k such that π is the minimal product of transpositions of the form si=(i,i+1) and k is the number of distinct si that appear.