Compatible Poisson brackets associated with 2-splittings and Poisson commutative subalgebras of S( g)

Abstract

Let S( g) be the symmetric algebra of a reductive Lie algebra g equipped with the standard Poisson structure. If C⊂ S( g) is a Poisson-commutative subalgebra, then trdeg\, Cb( g), where b( g)=( g+ rk g)/2. We present a method for constructing the Poisson-commutative subalgebra Z h, r of transcendence degree b( g) via a vector space decomposition g= h r into a sum of two spherical subalgebras. There are some natural examples, where the algebra Z h, r appears to be polynomial. The most interesting case is related to the pair ( b, u-), where b is a Borel subalgebra of g. Here we prove that Z b, u- is maximal Poisson-commutative and is complete on every regular coadjoint orbit in g*. Other series of examples are related to decompositions associated with involutions of g.