Higher-dimensional Heegaard Floer homology and spectral networks
Abstract
Given a closed surface C and a real exact Lagrangian ⊂ T*C associated to a spectral curve, we construct a homomorphism BSk(C)Mat(N,BSk()) from the braid skein algebra of C to the matrix-valued braid skein algebra of using Floer theory and in particular higher-dimensional Heegaard Floer homology (HDHF). We sketch a proof that this map coincides with a hybrid Floer-Morse approach which counts HDHF-type holomorphic curves coupled with certain Morse gradient graphs -- called fold\-ed Morse trees -- using a variant of the adiabatic limit theorems of Fukaya-Oh and Ekholm, which compares holomorphic curves and Morse flow trees.
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