Self-dual intervals in the Bruhat order

Abstract

Bj\"orner-Ekedahl prove that general intervals [e,w] in Bruhat order are "top-heavy", with at least as many elements in the i-th corank as the i-th rank. Well-known results of Carrell and of Lakshmibai-Sandhya give the equality case: [e,w] is rank-symmetric if and only if the permutation w avoids the patterns 3412 and 4231 and these are exactly those w such that the Schubert variety Xw is smooth. In this paper we study the finer structure of rank-symmetric intervals [e,w], beyond their rank functions. In particular, we show that these intervals are still "top-heavy" if one counts cover relations between different ranks. The equality case in this setting occurs when [e,w] is self-dual as a poset; we characterize these w by pattern avoidance and in several other ways.