Concordances of sums of alternating torus knots and their mirrors to L-space knots
Abstract
Continuing the work of Zemke, Livingston and Allen, we consider when linear combinations of torus knots are concordant to L-space knots. We begin by proving Allen's conjecture for alternating torus knots. That is, we prove that a linear combination of alternating torus knots is concordant to an L-space knot if and only if the connected sum is a single torus knot. Then we establish a necessary condition for when a linear combination of torus knots is concordant to an L-space knot.
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