Diameters of graphs of reduced words and rank-two root subsystems
Abstract
We study the diameter of the graph G(w) of reduced words of an element w in a Coxeter group W whose edges correspond to applications of the Coxeter relations. We resolve conjectures of Reiner--Roichman and Dahlberg--Kim by proving a tight lower bound on this diameter when W=Sn is the symmetric group and by characterizing the equality cases. We also give partial results in other classical types which illustrate the limits of current techniques.
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