Boolean elements in the Bruhat order

Abstract

We show that w∈ W is boolean if and only if it avoids a set of Billey-Postnikov patterns, which we describe explicitly. Our proof is based on an analysis of inversion sets, and it is in large part type-uniform. We also introduce the notion of linear pattern avoidance, and show that boolean elements are characterized by avoiding just the 3 linear patterns s1 s2 s1 ∈ W(A2), s2 s1 s3 s2 ∈ W(A3), and s2 s1 s3 s4 s2 ∈ W(D4). We also consider the more general case of k-boolean Weyl group elements. We say that w∈ W is k-boolean if every reduced expression for w contains at most k copies of each generator. We show that the 2-boolean elements of the symmetric group Sn are characterized by avoiding the patterns 3421,4312,4321, and 456123, and give a rational generating function for the number of 2-boolean elements of Sn.