Opers versus nonabelian Hodge
Abstract
For a complex simple simply connected Lie group G, and a compact Riemann surface C, we consider two sorts of families of flat G-connections over C. Each family is determined by a point u of the base of Hitchin's integrable system for (G,C). One family ∇, u consists of G-opers, and depends on ∈ C×. The other family ∇R,ζ, u is built from solutions of Hitchin's equations, and depends on ζ ∈ C×, R ∈ R+. We show that in the scaling limit R 0, ζ = R, we have ∇R,ζ, u ∇, u. This establishes and generalizes a conjecture formulated by Gaiotto.
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