The argument shift method in universal enveloping algebra Ugld

Abstract

We prove the conjecture that allows one extend the argument shifting procedure from symmetric algebra Sgld of the Lie algebra gld to the universal enveloping algebra Ugld. Namely, it turns out that the iterated quasi-derivations of the central elements in Ugld commute with each other. Here quasi-derivation is a linear operator on Ugld, constructed by Gurevich, Pyatov and Saponov. This allows one better understand the structure of argument shift algebras (or Mishchenko-Fomenko algebras) in the universal enveloping algebra of gld.