Non-realizability of the pure braid group as area-preserving homeomorphisms

Abstract

Let Homeo+(D2n) be the group of orientation-preserving homeomorphisms of D2 fixing the boundary pointwise and n marked points as a set. Nielsen realization problem for the braid group asks whether the natural projection pn:Homeo+(D2n) Bn:=π0(Homeo+(D2n)) has a section over subgroups of Bn. All of the previous methods either use torsions or Thurston stability, which do not apply to the pure braid group PBn, the subgroup of Bn that fixes n marked points pointwise. In this paper, we show that the pure braid group has no realization inside the area-preserving homeomorphisms using rotation numbers.