An order on circular permutations
Abstract
Motivation coming from the study of affine Weyl groups, a structure of ranked poset is defined on the set of circular permutations in Sn (that is, n-cycles). It is isomorphic to the poset of so-called admitted vectors, and to an interval in the affine symmetric group Sn with the weak order. The poset is a semidistributive lattice, and the rank function, whose range is cubic in n, is computed by some special formula involving inversions. We prove also some links with Eulerian numbers, triangulations of an n-gon, and Young's lattice.
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