On the Kronheimer-Mrowka concordance invariant

Abstract

Kronheimer and Mrowka introduced a new knot invariant, called s, which is a gauge theoretic analogue of Rasmussen's s invariant. In this article, we compute Kronheimer and Mrowka's invariant for some classes of knots, including algebraic knots and the connected sums of quasi-positive knots with non-trivial right handed torus knots. These computations reveal some unexpected phenomena: we show that s does not have to agree with s, and that s is not additive under connected sums of knots. Inspired by our computations, we separate the invariant s into two new invariants for a knot K, s+(K) and s-(K), whose sum is s(K). We show that their difference satisfies 0 ≤ s+(K) - s-(K) ≤ 2. This difference may be of independent interest. We also construct two link concordance invariants that generalize s, one of which we continue to call s, and the other of which we call sI. To construct these generalizations, we give a new characterization of s using immersed cobordisms rather than embedded cobordisms. We prove some inequalities relating the genus of a cobordism between two links and the invariant s of the links. Finally, we compute s and sI for torus links.