(Ir)regular singularities and Quantum Field Theory

PUBLICATIONS

| Character varieties and Higgs bundles

Principal Schottky Bundles over Riemann surfaces

Author(s)

A. Casimiro, S. Ferreira and C. Florentino

Topic

Character varieties and Higgs bundles

Abstract

We introduce and study (strict) Schottky G-bundles over a compact Riemann surface X, where G is a connected reductive algebraic group. Strict Schottky representations are shown to be related to branes in the moduli space of G-Higgs bundles over X, and we prove that all Schottky
G-bundles have trivial topological type. Generalizing the Schottky moduli map introduced in Florentino to the setting of principal bundles, we prove its local surjectivity at the good and unitary locus. Finally, we prove that the Schottky map is surjective onto the space of flat bundles for two special classes: when G is an abelian group over an arbitrary X, and the case of a general G-bundle over an elliptic curve.

Year

2018

Reference

A. Casimiro, S. Ferreira, C. Florentino, “Principal Schottky Bundles over Riemann surfaces”, Geom Dedicata (2018)

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