Lax matrices from antidominantly shifted Yangians and quantum affine algebras: A-type

Abstract

We construct a family of GLn rational and trigonometric Lax matrices TD(z) parametrized by +-valued divisors D on P1. To this end, we study the shifted Drinfeld Yangians Yμ(gln) and quantum affine algebras Uμ+,μ-(Lgln), which slightly generalize their sln-counterparts. Our key observation is that both algebras admit the RTT type realization when μ (respectively, μ+ and μ-) are antidominant coweights. We prove that TD(z) are polynomial in z (up to a rational factor) and obtain explicit simple formulas for those linear in z. This generalizes the recent construction by the first two authors of linear rational Lax matrices in both trigonometric and higher z-degree directions. Furthermore, we show that all TD(z) are normalized limits of those parametrized by D supported away from \∞\ (in the rational case) or \0,∞\ (in the trigonometric case). The RTT approach provides conceptual and elementary proofs for the construction of the coproduct homomorphisms on shifted Yangians and quantum affine algebras of sln, previously established via rather tedious computations. Finally, we establish a close relation between a certain collection of explicit linear Lax matrices and the well-known parabolic Gelfand-Tsetlin formulas.