A family of concordance homomorphisms from Khovanov homology

Abstract

By considering a version of Khovanov homology incorporating both the Lee and E(-1) differentials, we construct a 1-parameter family of concordance homomorphisms similar to the Upsilon invariant from knot Floer homology. This invariant gives lower bounds on the slice genus and can be used to prove that certain infinite families of pretzel knots are linearly independent in the smooth concordance group.