On the Sperner property for the absolute order on complex reflection groups

Abstract

Two partial orders on a reflection group, the codimension order and the prefix order, are together called the absolute order when they agree. We show that in this case the absolute order on a complex reflection group has the strong Sperner property, except possibly for the Coxeter group of type Dn, for which this property is conjectural. The Sperner property had previously been established for the noncrossing partition lattice NCW, a certain maximal interval in the absolute order, but not for the entire poset, except in the case of the symmetric group. We also show that neither the codimension order nor the prefix order has the Sperner property for general complex reflection groups.