Reduced decompositions and commutation classes

Abstract

We study three aspects of commutation classes of reduced decompositions: the number of commutation classes, the structures of their corresponding graphs, and the enumeration of subnetworks, a concept recently introduced by Warrington [21]. Our bound for the number of commutation classes generalizes the works of Knuth[12], Green and Losonczy [7], and Tenner [19]. We analyze the structure of the graph G(w) using pattern avoidance, which provides an application of Tenner's characterization of vexillary permutations in [19]. We also discuss some connections between our work and recent developments in the strong Bruhat order and the higher Bruhat order.