Real bordered Floer homology
Abstract
Fix a 3-manifold Y with boundary F F and an orientation-preserving involution τ: Y Y exchanging the boundary components, with nonempty fixed set. To an appropriate kind of Heegaard diagram for Y, we describe how to associate a module over the bordered Heegaard Floer algebra of F. These modules satisfy a gluing, or pairing, theorem, and extend the "hat" variant of Guth-Manolescu's real Heegaard Floer homology, HFR(Y,τ). Using these modules, we give a practical algorithm to compute HFR(Y,τ) for real 3-manifolds (Y,τ) with connected fixed set.
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