Cubulation of Bruhat graphs

Abstract

For (W,S) an arbitrary Coxeter system and any y ∈ W, we investigate the condition that the Bruhat graph for the interval [1,y] can be cubulated, meaning roughly that this graph can be spanned by a product of subintervals of Z. Results of Carrell-Peterson and Elias-Williamson imply that if [1,y] can be cubulated, then the Kazhdan-Lusztig polynomial Px,y = 1 for all x ≤ y. We consider the converse to this result. For (W,S) finite and w0 the longest element in W, so that Px,w0 = 1 for all x ∈ W, we use normal form forests to construct cubulations of [1,w0] in types A and B/C. However, in some exceptional types, we determine elements y ∈ W such that P1,y = 1 but [1,y] cannot be cubulated. We then prove that if there are infinitely many y ∈ W such that [1,y] can be cubulated, then (W,S) must be of type An for some n ≥ 1. Finally, for (W,S) of type A2, we exhibit a cubulation of [1,y] for each of the infinitely many y ∈ W such that Px,y = 1 for all x ≤ y.