Analytic Langlands correspondence for PGL2(C) on a genus one curve with parabolic structures
Abstract
Analytic Langlands correspondence was proposed by Etingof, Frenkel and Kazhdan. On one side of this correspondence there are certain operators on L2(BunG), called Hecke operators, where BunG is the variety of stable G-bundles on X and L2(BunG) is a Hilbert space of square-integrable half-densities. The compactness conjecture says that Hecke operators are bounded and, moreover, compact. In arXiv:2106.05243 Etingof, Frenkel and Kazhdan prove this and other conjectures in the case of G=PGL2 and X=P1 with parabolic structures. We investigate the case of G=PGL2 and genus one curve over complex numbers with parabolic structures. We obtain an explicit formula for Hecke operators and prove the compactness conjecture in this case.
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