The conformal limit and projective structures
Abstract
The non-abelian Hodge correspondence maps a polystable -Higgs bundle on a compact Riemann surface of genus to a connection which, in some cases, is the holonomy of a branched hyperbolic structure. On the other hand, Gaiotto's conformal limit maps the same bundle to a partial oper, i.e., to a connection whose holonomy is that of a branched complex projective structure compatible with . In this article, we show how these are both instances of the same phenomenon: the family of connections appearing in the conformal limit can be understood as a family of complex projective structures, deforming the hyperbolic ones into the ones compatible with . We also show that, when the Higgs bundle has zero Toledo invariant, this deformation is optimal, inducing a geodesic on Teichm\"uller's metric space.
Keywords
Cite
@article{arxiv.2401.07759,
title = {The conformal limit and projective structures},
author = {Pedro M. Silva and Peter B. Gothen},
journal= {arXiv preprint arXiv:2401.07759},
year = {2024}
}
Comments
24 pages, comments welcome. V2: minor corrections and improvements. To appear in IMRN