Paper
Wild genus-zero quantum de Rham spaces
Authors
Matthew Chaffe, Gabriele Rembado, Daisuke Yamakawa
Abstract
The wild de Rham spaces parameterize isomorphism classes of (stable) meromorphic connections, defined on principal bundles over wild Riemann surfaces. Working on the Riemann sphere, we will deformation-quantize the standard open part of de Rham spaces, which corresponds to the moduli of linear partial differential equations with meromorphic coefficients. We treat the general (typically nongeneric) untwisted/unramified case with semisimple formal residue, for any polar divisor and reductive structure group, without using parabolic/parahoric structures on the trivial bundle. The main ingredients are: (i) constructing the quantum Hamiltonian reduction of a (tensor) product of quantized coadjoint orbits in dual truncated-current Lie algebras, involving the corresponding category-O Verma modules; and (ii) establishing sufficient conditions on the coadjoint orbits, so that generically all meromorphic connections are stable, and the (semiclassical) moment map for the gauge-group action is faithfully flat.