Instanton dimensions of knot surgeries over arbitrary fields
Abstract
Suppose K ⊂ S3 is a knot and suppose p and q are co-prime integers with q 1. For any field K, we establish a dimension formula for the framed instanton homology of knot surgeries: I(S3p/q(K); K) = q · rK(K) + |p - q · K(K)| for certain integers rK(K) and K(K), except possibly when p/q = K(K) and K(K) is even. This formula generalizes the result of Baldwin--Sivek from the case K = C to arbitrary fields. Based on the result for K = Z/2, we obtain that S3p/q(K) is not SU(2)-abelian for any knot K other than the unknot and the right-handed trefoil whenever p/q ∈ [0,6) and p ∈ \ ae, 2ae \ for some prime number a and natural number e, thereby extending existing results for p/q ∈ [0,5] and p = ae. A byproduct of the techniques developed in this paper is that we generalize the distance-two surgery exact triangle by Culler--Daemi--Xie and Daemi--Miller-Eismeier--Lidman from Z/2 coefficients to any coefficient ring.
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