A partial order on the 240 packings of PG(3,2)

Abstract

It has long been known that the most symmetrical solutions of Kirkman's Schoolgirl Problem can be constructed from the 240 packings of the projective space PG(3, 2), but it seems to have escaped notice that these packings have the structure of a partially ordered set. In this paper, we construct a shellable Bruhat-like graded partial order on the packings of PG(3, 2) that refines the partial order on the product of four chains [8]×[5]×[3]×[2] and defines a Lehmer code on the packings. The partial order exists because the packings of PG(3, 2) form a quasiparabolic set (in the sense of Rains--Vazirani) that is in bijective correspondence with a certain collection of maximal orthogonal subsets of the E8 root system. The E8 construction also induces transitive actions of the Weyl groups of type Dn on the packings for 5 ≤ n ≤ 8, and these actions are faithful for n < 8. It is possible to define both the signed permutation action and the partial order using the combinatorics of labelled Fano planes.

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