Floer homotopy type and eta invariants of Seifert 3-manifolds fibering over RP2

Abstract

We compute the Floer homology and Seiberg-Witten Floer homotopy type of Seifert rational homology 3-spheres which fiber over RP2. We show that they are all L-spaces and their Floer homotopy type is a suspension of S0. Additionally, we compute the Ozsv\'ath-Szab\'o d-invariants, or equivalently the Seiberg-Witten δ-invariants for such 3-manifolds. This is done by computing the eta invariant of spinc-Dirac operators associated to spinc-connections covering the adiabatic connection, a certain metric connection distinct from the Levi-Civita connection. It turns out that this eta invariant involves a contribution given by the eta invariant of an orbifold pinc-connection on the orbifold base of the Seifert fibration, which we also compute.