On finite Thurston type orderings of braid groups

Abstract

We prove that for any finite Thurston-type ordering <T on the braid group\ Bn, the restriction to the positive braid monoid (Bn+,<T) is a\ well-ordered set of order type ωωn-2. The proof uses a combi\ natorial description of the ordering <T. Our combinatorial description is \ based on a new normal form for positive braids which we call the -normal fo\ rm. It can be seen as a generalization of Burckel's normal form and Dehornoy's \ -normal form (alternating normal form).