Ascent sliceness

Abstract

We introduce the notion of ascent sliceness of virtual knots. A representative of a virtual knot is an embedding S1 g × I , for g a closed connected oriented surface of genus g ; the virtual knot represented is slice if there exists a pair consisting of a disc D and an oriented 3 -manifold M , such that D M × I , ∂ M = g , and ∂ D = S1 (the image of the embedding). This definition of sliceness exemplifies that a cobordism of virtual links is a pair consisting of a surface and a 3 -manifold; in addition to analysing the surfaces, as is done in classical knot theory, we may analyse the 3 -manifolds appearing in cobordisms between virtual knots. In particular, consider a Morse function on the 3 -manifold M : away from critical points the level sets are surfaces, and we may ask how the genus of these surfaces changes as we move through the cobordism. Roughly, a slice virtual knot K with genus-minimal representative S1 g × I is ascent slice if, given any disc and 3 -manifold pair ( D, M ) as above, and any Morse function f : M → I , the surface g+1 appears as a level set of f . We use an augmented version of doubled Khovanov homology to define a property which implies ascent sliceness for slice virtual knots of minimal supporting genus 1 .