Rational version of Archimedes symplectomorphysm and birational Darboux coordinates on coadjoint orbit of GL(N,C)

Abstract

A set of all linear transformations with a fixed Jordan structure J is a symplectic manifold isomorphic to the coadjoint orbit O (J) of GL(N,C). Any linear transformation may be projected along its eigenspace to (at least one) coordinate subspace of the complement dimension. The Jordan structure J of the image is defined by the Jordan structure J of the pre-image, consequently the projection O (J) O ( J) is the mapping of the symplectic manifolds. It is proved that the fiber E of the projection is a linear symplectic space and the map O(J) E × O ( J) is a birational symplectomorphysm. The iteration of the procedure gives the isomorphism between O (J) and the linear symplectic space, which is the direct product of all the fibers of the projections. The Darboux coordinates on O(J) are pull-backs of the canonical coordinates on the linear spaces in question.