Brieskorn spheres and rational homology ball symplectic fillings

Abstract

Given a canonically oriented Brieskorn sphere Y=Σ(a1,...,an), we confirm some statements conjectured by Gompf. More specifically, we obstruct the existence of rational homology ball symplectic fillings for any contact structure on -Y if n=3, and when there is no half convex Giroux torsion for n>3. Furthermore, we show that the same result holds for the Milnor fillable structure on Y with the possible exception of Σ(3,4,5), Σ(2,5,7) and Σ(2,3,6k+1) for k≥1. Along the way, we determine every canonically oriented Brieskorn sphere with vanishing correction term carrying at most two fillable structures, up to isotopy.