Minimal coadjoint orbits and symplectic induction
摘要
Let be an integral symplectic manifold and let be a quantum line bundle, with connection, over having as curvature. With this data one can define an induced symplectic manifold where . It is then shown that prequantization on becomes classical Poisson bracket on . We consider the possibility that if is the coadjoint orbit of a Lie group then is the coadjoint orbit of some larger Lie group . We show that this is the case if is a non-compact simple Lie group with a finite center and is the maximal compact subgroup of . The coadjoint orbit arises (Borel-Weil) from the action of on where is a Cartan decomposition. Using the Kostant-Sekiguchi correspondence and a diffeomorphism result of M. Vergne we establish a symplectic isomorphism where is a non-zero minimal "nilpotent" coadjoint orbit of . This is applied to show that the split forms of the 5 exceptional Lie groups arise symplectically from the symplectic induction of coadjoint orbits of certain classical groups.
引用
@article{arxiv.math/0312252,
title = {Minimal coadjoint orbits and symplectic induction},
author = {Bertram Kostant},
journal= {arXiv preprint arXiv:math/0312252},
year = {2007}
}
备注
38 pages, plain tex