Rigidity of braid group actions on R and of low-genus mapping class group actions on S1

Abstract

Every nontrivial action of the braid group Bn on R by orientation-preserving homeomorphisms yields, up to conjugation by a homeomorphism of R, a representation : Bn → Homeo+(S1) and therefore determines a translation number for every element of Bn. In this manuscript we offer a simple characterisation of which actions of Bn on R produce translation numbers that agree with those arising from the standard Nielsen-Thurston action on R. Our approach is to prove an analogous statement concerning left orderings of Bn via a technique that uses the space of left orderings of Bn, the isolated points in this space, and the natural conjugacy action of Bn. We use this result to extend recent rigidity results of Mann and Wolff concerning mapping class group actions on S1 to the case of low-genus surfaces with marked points.

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