Cyclotomic Gaudin models, Miura opers and flag varieties

Abstract

Let g be a semisimple Lie algebra over C. Let ∈ Aut\, g be a diagram automorphism whose order divides T ∈ Z≥ 1. We define cyclotomic g-opers over the Riemann sphere P1 as gauge equivalence classes of g-valued connections of a certain form, equivariant under actions of the cyclic group Z/ TZ on g and P1. It reduces to the usual notion of g-opers when T = 1. We also extend the notion of Miura g-opers to the cyclotomic setting. To any cyclotomic Miura g-oper ∇ we associate a corresponding cyclotomic g-oper. Let ∇ have residue at the origin given by a -invariant rational dominant coweight λ0 and be monodromy-free on a cover of P1. We prove that the subset of all cyclotomic Miura g-opers associated with the same cyclotomic g-oper as ∇ is isomorphic to the -invariant subset of the full flag variety of the adjoint group G of g, where the automorphism depends on , T and λ0. The big cell of the latter is isomorphic to N, the -invariant subgroup of the unipotent subgroup N ⊂ G, which we identify with those cyclotomic Miura g-opers whose residue at the origin is the same as that of ∇. In particular, the cyclotomic generation procedure recently introduced in [arXiv:1505.07582] is interpreted as taking ∇ to other cyclotomic Miura g-opers corresponding to elements of N associated with simple root generators. We motivate the introduction of cyclotomic g-opers by formulating two conjectures which relate them to the cyclotomic Gaudin model of [arXiv:1409.6937].