Projective Naturality in Heegaard Floer Homology

Abstract

Let Man* denote the category of closed, connected, oriented and based 3-manifolds, with basepoint preserving diffeomorphisms between them. Juh\'asz, Thurston and Zemke showed that the Heegaard Floer invariants are natural with respect to diffeomorphisms, in the sense that there are functors HF: Man* → F2[U]-Mod whose values agree with the invariants defined by Ozsv\'ath and Szab\'o. The invariant associated to a based 3-manifold comes from a transitive system in F2[U]-Mod associated to a graph of embedded Heegaard diagrams representing the 3-manifold. We show that the Heegaard Floer invariants yield functors HF: Man* → Trans(P(Z[U]-Mod)) to the category of transitive systems in a projectivized category of Z[U]-modules. In doing so, we will see that the transitive system of modules associated to a 3-manifold actually comes from an underlying transitive system in the projectivized homotopy category of chain complexes over Z[U]-Mod. We discuss an application to involutive Heegaard Floer homology, and potential generalizations of our results.