Explicit Koszul-dualizing bimodules in bordered Heegaard Floer homology
Abstract
We give a combinatorial proof of the quasi-invertibility of CFDD(IZ) in bordered Heegaard Floer homology, which implies a Koszul self-duality on the dg-algebra A(Z), for each pointed matched circle Z. This is done by giving an explicit description of a rank 1 model for CFAA(IZ), the quasi-inverse of CFDD(IZ). This description is obtained by applying homological perturbation theory to a larger, previously known model of CFAA(IZ).
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