Positivity and representations of surface groups
Abstract
In arXiv:1802.02833 Guichard and Wienhard introduced the notion of -positivity, a generalization of Lusztig's total positivity to real Lie groups that are not necessarily split. Based on this notion, we introduce in this paper -positive representations of surface groups. We prove that -positive representations are -Anosov. This implies that -positive representations are discrete and faithful and that the set of -positive representations is open in the representation variety. We show that the set of -positive representations is closed within the set of representations that do not virtually factor through a parabolic subgroup. From this we deduce that for any simple Lie group G admitting a -positive structure there exist components consisting of -positive representations. More precisely we prove that the components parametrized using Higgs bundles methods in arXiv:2101.09377 consist of -positive representations.
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