Topology of complex reflection arrangements

Abstract

Let V be a finite dimensional complex vector space and W⊂ (V) be a finite complex reflection group. Let V be the complement in V of the reflecting hyperplanes. A classical conjecture predicts that V is a K(pi,1) space. When W is a complexified real reflection group, the conjecture follows from a theorem of Deligne. Our main result validates the conjecture for duality (or, equivalently, well-generated) complex reflection groups. This includes the complexified real case (but our proof is new) and new cases not previously known. We also address a number of questions about π1(W V), the braid group of W.

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