Paper detail

Complex Chern--Simons bundles in the relative setting

Complex Chern-Simons bundles are line bundles with connection, originating in the study of quantization of moduli spaces of flat connections with complex gauge groups. In this paper we introduce and study these bundles in the families setting. The central object is a functorial direct image of characteristic classes of vector bundles with connections, for which we develop a formalism. Our strategy elaborates on Deligne-Elkik's intersection bundles, and a refined Chern-Simons theory which parallels the use of Bott-Chern classes in Arakelov geometry. In the context of moduli spaces, we are confronted with flat relative connections on families of Riemann surfaces. To be able to rely on the functorial approach, we prove canonical extension results to global connections, inspired by the deformation theory of harmonic maps in non-abelian Hodge theory. The relative complex Chern-Simons bundle $\mathcal{L}_{CS}$ is then defined as a functorial direct image of the second Chern class on the relative moduli space of flat vector bundles. We establish the crystalline nature of $\mathcal{L}_{CS}$, and the existence of a holomorphic extension of natural metrics from Arakelov geometry. The curvature of $\mathcal{L}_{CS}$ can be expressed in terms of the Atiyah-Bott-Goldman form, in agreement with the classical topological approach. To highlight a few applications, we first mention a characterization of projective structures of Riemann surfaces in terms of connections on intersection bundles. In particular, we settle a conjecture of Bertola-Korotkin-Norton on the comparison between the Bergman and the Bers projective structures. This is the problem of determining the accessory parameters of quasi-Fuchsian uniformizations. A conjecture of Cappell-Miller is also established, to the effect that their holomorphic torsion satisfies a Riemann-Roch formula.