Spectra of Bethe subalgebras of Y(gln) in tame representations

Abstract

We study the eigenproblem for Bethe subalgebras of the Yangian Y(gln) in tame representations, i.e. in finite dimensional representations which admit Gelfand-Tsetlin bases. Namely, we prove that for any tensor product of skew modules V=i=1k Vλi μi(zi) over the Yangian Y(gln) with generic zi's, the family of Bethe subalgebras B(X) with X being a regular element of the maximal torus of GLn (or, more generally, with X ∈ M0,n+2) acts with a cyclic vector on V. Moreover, for X in the real form of M0,n+2 which is the closure of regular unitary diagonal matrices we show, that the family of subalgebras B(X) acts with simple spectrum on i=1k Vλi μi(zi) for generic zi's where all Vλi μi(zi) are Kirillov-Reshetikhin modules. In the subsequent paper we will use this to define a KR-crystal structure on the spectrum of a Bethe subalgebra on V.