Singular instanton homology of dual knots

Abstract

We establish a dimension formula for the unreduced singular instanton homology of dual knots Kp/q⊂ S3p/q(K) for a knot K⊂ S3: I(S3p/q(K),Kp/q,ω; K) = 2q · rK(K) + 2|p - q · K(K)|~for~p/q≠ K(K), where ω⊂ S3 K is any unoriented 1-submanifold as the bundle set, rK(K) and K(K) are integers from the dimension formula of I(S3p/q(K);K) for a field K defined by Li and the author. In particular, when K is the two-element field F2, the reduced singular instanton homology satisfies\[ I(S3p/q(K),Kp/q,ω;F2)= I(S3p/q(K);F2)~for~p/q≠ F2(K).\]As an application, for a determinant-one knot K⊂ S3 other than the unknot and the torus knots T2,3,T2,5 and a rational p/q∈ (0,6) with p odd prime power, the surgery manifold Yp/2q(K) is not SU(2)-abelian for the double branched cover Y=(S3,K) and the preimage K⊂ Y of K. We also obtain non-abelian results for SU(2) representations of the knot complement that send the curves of some fixed slope in (0,6) to traceless elements.

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