A spanning tree model for the Heegaard Floer homology of a branched double-cover
Abstract
Given a diagram of a link K in S3, we write down a Heegaard diagram for the branched-double cover Sigma(K). The generators of the associated Heegaard Floer chain complex correspond to Kauffman states of the link diagram. Using this model we make some computations of the homology HF(Sigma(K)) as a graded group. We also conjecture the existence of a delta-grading on HF(Sigma(K)) analogous to the delta-grading on knot Floer and Khovanov homology.
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