Spectral invariants and equivariant monopole Floer homology for rational homology three-spheres

Abstract

In this paper, we study a model for S1-equivariant monopole Floer homology for rational homology three-spheres via a homological device called S-complex. Using the Chern-Simons-Dirac functional, we define an R-filtration on the (equivariant) complex of monopole Floer homology HM. This R-filtration fits HM into a persistent homology theory, from which one can define a numerical quantity called the spectral invariant . The spectral invariant is tied with the geometry of the underlying manifold. The main result of the papers shows that provides an obstruction to the existence of positive scalar curvature metric on a ribbon homology cobordism.