Epstein-Poincar\'e surfaces for G-opers
Abstract
Given a complex, simple Lie group G of adjoint type, we introduce the notion of an Epstein-Poincar\'e surface associated to a G-oper. These surfaces generalize Epstein's classical construction for G=PGL2 (C). As an application, we provide a criterion that ensures that the holonomy of the oper is -Anosov. Finally, we discuss how the developing map of the oper interacts with domains of discontinuity of the holonomy (whenever Anosov) and the transversality properties it satisfies. Along the way, we provide a quick review of opers that we hope serves as a self-contained introduction.
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