2-torsion in instanton Floer homology

Abstract

This paper studies the existence of 2-torsion in instanton Floer homology with Z coefficients for closed 3-manifolds and singular knots. First, we show that the non-existence of 2-torsion in the framed instanton Floer homology I(Sn3(K);Z) of any nonzero integral n-surgery along a knot K in S3 would imply that K is fibered. Also, we show that I(Sr3(K);Z) for any nontrivial K with r=1,1/2,1/4 always has 2-torsion. These two results indicate that the existence of 2-torsion is expected to be a generic phenomenon for Dehn surgeries along knots. Second, we show that for genus-one knots with nontrivial Alexander polynomials and for unknotting-number-one knots, the unreduced singular instanton knot homology I(S3,K;Z) always has 2-torsion. Finally, some crucial lemmas that help us demonstrate the existence of 2-torsion are motivated by analogous results in Heegaard Floer theory, which may be of independent interest. In particular, we show that, for a knot K in S3, if there is a nonzero rational number r such that the dual knot Kr inside S3r(K) is Floer simple, then S3r(K) must be an L-space and K must be an L-space knot.

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