Abstract integrable systems on hyperk\"ahler manifolds arising from Slodowy slices

Abstract

We study holomorphic integrable systems on the hyperk\"ahler manifold G× Sreg, where G is a complex semisimple Lie group and Sreg is the Slodowy slice determined by a regular sl2(C)-triple. Our main result is that this manifold carries a canonical abstract integrable system, a foliation-theoretic notion recently introduced by Fernandes, Laurent-Gengoux, and Vanhaecke. We also construct traditional integrable systems on G× Sreg, some of which are completely integrable and fundamentally based on Mishchenko and Fomenko's argument shift approach.