Instanton 2-torsion and Dehn surgeries

Abstract

In our earlier work on 2-torsion in instanton Floer homology, we considered only integral surgeries on a knot K⊂ S3 and showed that the absence of 2-torsion forces K to be fibered. The present paper extends the result to all rational surgeries. We prove that if the framed instanton homology I(S3r(K);Z) is 2-torsion-free for some r∈ Q+, then K is an instanton L-space knot and r>2g(K)-1. Leveraging this 2-torsion perspective, we also obtain new small-surgery obstructions: If either S35(K) or S311/2(K) is SU(2)-abelian, then K must be the unknot or the right-handed trefoil. This result sharpens the small-SU(2)-abelian surgery theorems of Kronheimer--Mrowka, Baldwin--Sivek, and Baldwin--Li--Sivek--Ye.