An Ozsváth--Szabó-type spectral sequence for links in $S^1\times S^2$

Abstract: We show that there is a spectral sequence with $E^2$-page given by the Khovanov homology of a link in $S^1\times S^2$, as defined by Rozansky in arXiv:1011.1958, which converges to the Hochschild homology of an $A_\infty$-bimodule defined in terms of bordered Floer invariants. We also show that the homology algebras $H_*\mathfrak{h}n$ of the algebras $\mathfrak{h}_n$ over which these bimodules are defined give nontrivial $A\infty$-deformations of Khovanov's arc algebras $H_n$ for $n>1$.