Knot traces and concordance
Abstract
We give a method for constructing many pairs of distinct knots K0 and K1 such that the two 4-manifolds obtained by attaching a 2-handle to B4 along Ki with framing zero are diffeomorphic. We use the d-invariants of Heegaard Floer homology to obstruct the smooth concordance of some of these K0 and K1, thereby disproving a conjecture of Abe in [Abe16]. As a consequence, we obtain a proof that there exist patterns P in solid tori such that P(K) is not always concordant to P(U) \# K and yet whose action on the smooth concordance group is invertible.
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