On the spectral sequence from Khovanov homology to Heegaard Floer homology

Abstract

Ozsvath and Szabo show that there is a spectral sequence whose E2 term is the reduced Khovanov homology of L, and which converges to the Heegaard Floer homology of the (orientation reversed) branched double cover of S3 along L. We prove that the Ek term of this spectral sequence is an invariant of the link L for all k >= 2. If L is a transverse link in the standard tight contact structure on S3, then we show that Plamenevskaya's transverse invariant psi(L) gives rise to a transverse invariant, psik(L), in the Ek term for each k >= 2. We use this fact to compute each term in the spectral sequences associated to the torus knots T(3,4) and T(3,5).