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A Note on Knot Concordance

Published 6 Jul 2017 in math.GT | (1707.01650v3)

Abstract: We use classical techniques to answer some questions raised by Daniele Celoria about almost-concordance of knots in arbitrary closed $3$-manifolds. We first prove that, given $Y3 \neq S3$, for any non-trivial element $g\in \pi_1(Y)$ there are infinitely many distinct smooth almost-concordance classes in the free homotopy class of the unknot. In particular we consider these distinct smooth almost-concordance classes on the boundary of a Mazur manifold and we show none of these distinct classes bounds a PL-disk in the Mazur manifold, but all the representatives we construct are topologically slice. We also prove that all knots in the free homotopy class of $S1 \times pt$ in $S1 \times S2$ are smoothly concordant.

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