Аннотация:
In this talk, based on joint work with St. Wiedmann (Göttingen), certain
representation varieties of tame fundamental groups are studied. The two
cases under consideration are the tame fundamental groups of projective
algebraic curves over finite fields, resp. Riemann surfaces. The techniques
used are appropriate versions of the Langlands correspondence, resp.
theorems of Hitchin and Atiyah–Bott on moduli spaces of Higgs and ordinary
vector bundles.