Spectral Theory of the Nazarov-Sklyanin Lax Operator
Abstract
In their study of Jack polynomials, Nazarov-Sklyanin introduced a remarkable new graded linear operator L F[w] → F[w] where F is the ring of symmetric functions and w is a variable. In this paper, we (1) establish a cyclic decomposition F[w] λ Z(jλ, L) into finite-dimensional L-cyclic subspaces in which Jack polynomials jλ may be taken as cyclic vectors and (2) prove that the restriction of L to each Z(jλ, L) has simple spectrum given by the anisotropic contents [s] of the addable corners s of the Young diagram of λ. Our proofs of (1) and (2) rely on the commutativity and spectral theorem for the integrable hierarchy associated to L, both established by Nazarov-Sklyanin. Finally, we conjecture that the L-eigenfunctions λs ∈ F[w] with eigenvalue [s] and constant term λs|w=0 = jλ are polynomials in the rescaled power sum basis Vμ wl of F[w] with integer coefficients.
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