A Floer homology invariant for 3-orbifolds via bordered Floer theory

Abstract

Using bordered Floer theory, we construct an invariant HFO(Yorb) for 3-orbifolds Yorb with singular set a knot that generalizes the hat flavor HF(Y) of Heegaard Floer homology for closed 3-manifolds Y. We show that for a large class of 3-orbifolds, HFO behaves like HF in that HFO, together with a relative Z2-grading, categorifies the order of H1orb. When Yorb arises as Dehn surgery on an integer-framed knot in S3, we use the \-1,0,1\-valued knot invariant to determine the relationship between HFO(Yorb) and HF(Y) of the 3-manifold Y underlying Yorb.