A Bruhat order for Latin squares and alternating sign hypermatrices

Abstract

The Bruhat order on permutation matrices extends to alternating sign matrices via corner-sum matrices, where the order is given by entrywise domination. A classical result of Lascoux and Schützenberger states that alternating sign matrices form the Dedekind-MacNeille completion of the Bruhat order on permutations. Brualdi and Dahl introduced alternating sign hypermatrices as a three-dimensional analogue of alternating sign matrices and used them to generalise Latin squares, which may be viewed as three-dimensional analogues of permutation matrices. In this paper, in analogy with the two-dimensional case, we define and study a Bruhat order B on Latin squares and alternating sign hypermatrices. We introduce the corresponding corner-sum hypermatrices Cn and prove that entrywise domination on Cn encodes this order. We show that Cn is a distributive lattice, but that, unlike in dimension two, it is not the Dedekind-MacNeille completion of the poset of Latin squares. We further characterise the covering relations for Cn and prove rank formulae generalising the classical case of alternating sign matrices. Finally, we define monotone hypertriangles, prove that they are in bijection with Cn, and show that they also encode the order by entrywise domination.