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Langlands duality for Hitchin systems

Algebraic Geometry 2011-12-23 v3 High Energy Physics - Theory Representation Theory

Abstract

We show that the Hitchin integrable system for a simple complex Lie group GG is dual to the Hitchin system for the Langlands dual group \lanG\lan{G}. In particular, the general fiber of the connected component \Higgs0\Higgs_0 of the Hitchin system for GG is an abelian variety which is dual to the corresponding fiber of the connected component of the Hitchin system for \lanG\lan{G}. The non-neutral connected components \Higgsα\Higgs_{\alpha} form torsors over \Higgs0\Higgs_0. We show that their duals are gerbes over \Higgs0\Higgs_0 which are induced by the gerbe of GG-Higgs bundles \gHiggs\gHiggs. More generally, we establish a duality between the gerbe \gHiggs\gHiggs of GG-Higgs bundles and the gerbe \lan\gHiggs\lan{\gHiggs} of \lanG\lan{G}-Higgs bundles, which incorporates all the previous dualities. All these results extend immediately to an arbirtary connected complex reductive group G\mathbb{G}.

Keywords

Cite

@article{arxiv.math/0604617,
  title  = {Langlands duality for Hitchin systems},
  author = {Ron Donagi and Tony Pantev},
  journal= {arXiv preprint arXiv:math/0604617},
  year   = {2011}
}

Comments

75 pages, 1 figure, LaTeX. New version substantially expanded and revised for publication