Braid groups of normalizers of reflection subgroups

Abstract

Let W0 be a reflection subgroup of a finite complex reflection group W, and let B0 and B be their respective braid groups. In order to construct a Hecke algebra H0 for the normalizer NW(W0), one first considers a natural subquotient B0 of B which is an extension of NW(W0)/W0 by B0. We prove that this extension is split when W is a Coxeter group, and deduce a standard basis for the Hecke algebra H0. We also give classes of both split and non-split examples in the non-Coxeter case.