Concentration of symplectic volumes on Poisson homogeneous spaces

Abstract

For a compact Poisson-Lie group K, the homogeneous space K/T carries a family of symplectic forms ωs, where ∈ t*+ is in the positive Weyl chamber and s ∈ R. The symplectic form ω0 is identified with the natural K-invariant symplectic form on the K coadjoint orbit corresponding to . The cohomology class of ωs is independent of s for a fixed value of . In this paper, we show that as s -∞, the symplectic volume of ωs concentrates in arbitrarily small neighbourhoods of the smallest Schubert cell in K/T G/B. This strengthens earlier results [9,10] and is a step towards a conjectured construction of global action-angle coordinates on Lie(K)* [4, Conjecture 1.1].