Integral Klein bottle surgeries and Heegaard Floer homology

Abstract

We study which closed, connected, orientable three-manifolds X containing a Klein bottle arise as integral Dehn surgery along a knot in S3. Such X are presentable as a gluing of the twisted I-bundle over the Klein bottle to a knot manifold, and we use a variety of Heegaard Floer type invariants to generate surgery obstructions. Suppose that X is 8-surgery along a genus two knot, and arises by gluing the twisted I-bundle over the Klein bottle to an S3 knot complement. We show that X is an L-space, it must be the dihedral manifold (-1; 12, 12, 25), and the surgery knot must be K=T(2,5).