Continuous Noncrossing Partitions and Weighted Circular Factorizations

Abstract

This article examines noncrossing partitions of the unit circle in the complex plane; we call these continuous noncrossing partitions. More precisely, we focus on the degree-d continuous noncrossing partitions where unit complex numbers in the same block have identical d-th powers. We prove that the degree-d continuous noncrossing partitions form a topological poset whose uncountable set of elements can be indexed by equivalence classes of objects we call weighted linear factorizations of factors of a d-cycle. Moreover, the maximal elements in this poset form a subspace homeomorphic to the dual Garside classifying space for the d-strand braid group. The degree-d continuous noncrossing partitions of the unit circle are a special case of a more general construction. For every choice of Coxeter element c in any Coxeter group W we define a topological poset of equivalence classes of weighted linear factorizations of factors of c in W whose elements we call continuous c-noncrossing partitions. The maximal elements in this poset form a subspace homeomorphic to the one-vertex complex whose fundamental group is the corresponding dual Artin group.