Polyubles, Poisson homogeneous spaces and multi-flag varieties

Abstract

A polyuble of a Manin triple can be regarded as the ``n-th power'' of it, which plays an important rule in the study of Poisson geometry, mathematical physics and Lie theory. In this paper, we first construct an isomorphism between the mn-ble and the n-ubles of m-uble by colored graph and point out it is unique. Then, we construct a class of Poisson homogeneous spaces and obtain a class of Poisson homeomorphisms between them based on the first main result. Last, we apply first two main results to multi-flag varieties as well as multi-double flag varieties and construct a class of global Poisson isomorphisms between them as well as their T-leaves.