On the anti-diagonal filtration for the Heegaard Floer chain complex of a branched double-cover

Abstract

Seidel and Smith introduced the graded fixed-point symplectic Khovanov cohomology group Khsymp,inv(K) for a knot K inside S3, as well as a spectral sequence converging to the Heegaard Floer homology-hat group for the connected sum of the double branched cover with a copy of S2xS1. The E1-page of this spectral sequence is isomorphic to a factor of Khsymp,inv(K). Seidel and Smith proved that Khsymp,inv is a knot invariant. We show here that the higher pages of their spectral sequence are knot invariants also.