Gelfand-Tsetlin degeneration of shift of argument subalgebras in types B and C

Abstract

The universal enveloping algebra of any semisimple Lie algebra g contains a family of maximal commutative subalgebras, called shift of argument subalgebras, parametrized by regular Cartan elements of g. For g=gln the Gelfand-Tsetlin commutative subalgebra in U(g) arises as some limit of subalgebras from this family. We study the analogous limit of shift of argument subalgebras for the Lie algebras g=sp2n and g=so2n+1. The limit subalgebra is described explicitly in terms of Bethe subalgebras in twisted Yangians Y-(2) and Y+(2), respectively. We index the eigenbasis of such limit subalgebra in any irreducible finite-dimensional representation of g by Gelfand-Tsetlin patterns of the corresponding type, and conjecture that this indexing is, in appropriate sense, natural. According to arXiv:1708.05105 such eigenbasis has a natural g-crystal structure. We conjecture that this crystal structure coincides with that on Gelfand-Tsetlin patterns defined by Littelmann in https://doi.org/10.1007/BF01236431 .