Concordances from differences of torus knots to $L$-space knots

Abstract: It is known that connected sums of positive torus knots are not concordant to L-space knots. Here we consider differences of torus knots. The main result states that the subgroup of the concordance group generated by two positive torus knots contains no nontrivial L-space knots other than the torus knots themselves. Generalizations to subgroups generated by more than two torus knots are also considered.

“…This observation was examined further in Livingston [9] who established that a nontrivial connected sum of positive torus knots K is concordant to an L-space knot if and only if K is a single torus knot by using the Levine-Tristam signature function [3] [6] [14] and the tau invariant [11] [13]. Then Allen [2] proved that no linear combination of two torus knots is concordant to an L-space knot as well as making steps towards the general case by using the tau invariant, upsilon invariant [12], and the Levine-Tristram signature function. This previous work led to the following conjecture.…”

“…Conjecture (Allen [2]). If a connected sum of (possibly several) torus knots is concordant to an L-space knot, then it is concordant to a positive torus knot.…”

“…We shall begin by introducing theorems of Livingston [9] and Allen [2]. The following proposition, found in Livingston [9], proves Allen's conjecture for positive torus knots.…”

“…Allen [2] established the following proposition relating the Alexander polynomial of a linear combination of torus knots to a concordant L-space knot. Proposition 2.2 (Allen [2]).…”

Concordances of sums of alternating torus knots and their mirrors to $L$-space knots

“…This observation was examined further in Livingston [9] who established that a nontrivial connected sum of positive torus knots K is concordant to an L-space knot if and only if K is a single torus knot by using the Levine-Tristam signature function [3] [6] [14] and the tau invariant [11] [13]. Then Allen [2] proved that no linear combination of two torus knots is concordant to an L-space knot as well as making steps towards the general case by using the tau invariant, upsilon invariant [12], and the Levine-Tristram signature function. This previous work led to the following conjecture.…”

“…Conjecture (Allen [2]). If a connected sum of (possibly several) torus knots is concordant to an L-space knot, then it is concordant to a positive torus knot.…”

“…We shall begin by introducing theorems of Livingston [9] and Allen [2]. The following proposition, found in Livingston [9], proves Allen's conjecture for positive torus knots.…”

“…Allen [2] established the following proposition relating the Alexander polynomial of a linear combination of torus knots to a concordant L-space knot. Proposition 2.2 (Allen [2]).…”

Concordances of sums of alternating torus knots and their mirrors to $L$-space knots

Braids, Fibered Knots, and Concordance Questions