Khovanov homology and exotic 4-manifolds

Abstract

We show that the Khovanov-Rozansky gl2 skein lasagna module distinguishes the exotic pair of knot traces X-1(-52) and X-1(P(3,-3,-8)), an example first discovered by Akbulut. This gives the first analysis-free proof of the existence of exotic compact orientable 4-manifolds. We also present a family of exotic knot traces that seem not directly recoverable from gauge/Floer-theoretic methods. Along the way, we present new explicit calculations of the Khovanov skein lasagna modules, and we define lasagna generalizations of the Lee homology and Rasmussen s-invariant, which are of independent interest. Other consequences of our work include a slice obstruction of knots in 4-manifolds with nonvanishing skein lasagna module, a sharp shake genus bound for some knots from the lasagna s-invariant, and a construction of induced maps on Khovanov homology for cobordisms in kCP2.