Khovanov homology in characteristic two and involutive monopole Floer homology

Abstract

We study the conjugation involution in Seiberg-Witten theory in the context of the Ozsv\'ath-Szab\'o and Bloom's spectral sequence for the branched double cover of a link L in S3. We prove that there exists a spectral sequence of F[Q]/Q2-modules (where Q has degree -1) which converges to HMI*((L)), an involutive version of the monopole Floer homology of the branched double cover, and whose E2-page is a version of Bar Natan's characteristic two Khovanov homology of the mirror of L. We conjecture that an analogous result holds in the setting of Pin(2)-monopole Floer homology.