Poisson-commutative subalgebras of S( g) associated with involutions

Abstract

The symmetric algebra S( g) of a reductive Lie algebra g is equipped with the standard Poisson structure, i.e., the Lie-Poisson bracket. Poisson-commutative subalgebras of S( g) attract a great deal of attention, because of their relationship to integrable systems and, more recently, to geometric representation theory. The transcendence degree of a Poisson-commutative subalgebra C⊂ S( g) is bounded by the "magic number" b( g) of g. The "argument shift method" of Mishchenko-Fomenko was basically the only known source of C with trdeg\, C=b( g). We introduce an essentially different construction related to symmetric decompositions g= g0 g1. Poisson-commutative subalgebras Z, Z⊂ S( g) g0 of the maximal possible transcendence degree are presented. If the Z2-contraction g0 g1 ab has a polynomial ring of symmetric invariants, then Z is a polynomial maximal Poisson-commutative subalgebra of S( g) g0, and its free generators are explicitly described.