A Note On Projective Structures On Compact Surfaces

Abstract

Projective structures on topological surfaces support the structure of 2d CFTs with a degree of technical simplification. We propose a complex analytic space Pg biholomorphic to T*(1,0) Mg as a candidate moduli space of the projective structures of the genus g topological surface. Explicit analysis at g=1, including of the fibers over the fictitious orbifold loci of Mg=1 and of transformations under the modular group, supports this proposal. It also shows that Pg=1 naturally resolves the orbifold locus of the affine structure moduli space Ag=1 which is related to the Hodge bundle over Mg=1. For g ≥ 2, intricate quotient operations are expected along fibers over the orbifold loci of Mg, whose analysis we leave to future work. Physically, the space Pg represents the bundle of universal, stationary, chiral hydrodynamic flows spatially confined to compact genus-g Riemann surfaces.