$L^{2}$ -Cohomology of quasi-fibered boundary metrics

Abstract

We develop new techniques to compute the weighted \(L^{2}\)-cohomology of quasi-fibered boundary metrics (QFB-metrics). Combined with the decay of \(L^{2}\)-harmonic forms obtained in a companion paper, this allows us to compute the reduced \(L^{2}\)-cohomology for various classes of QFB-metrics. Our results applies in particular to the Nakajima metric on the Hilbert scheme of \(n\) points on \(\mathbb{C}^{2}\), for which we can show that the Vafa-Witten conjecture holds. Using the compactification of the monopole moduli space announced by Fritzsch, the first author and Singer, we can also give a proof of the Sen conjecture for the monopole moduli space of magnetic charge 3.