Abstract
The coadjoint orbits of compact Lie groups each carry a canonical (positive definite) Kähler structure, famously used to realize the group's irreducible representations in holomorphic sections of appropriate line bundles (Borel-Weil theorem). Less studied are the (indefinite) invariant pseudo-Kähler structures they also admit, which can be used to realize the same representations in higher cohomology of the sections (Bott's theorem). Using “eigenflag” embeddings, we give a very explicit description of these metrics in the case of the unitary group. As a byproduct we show that Un/(Un1×⋯×Unk) has exactly k! invariant complex structures, a count which seems to have hitherto escaped attention.
| Original language | English |
|---|---|
| Article number | 101968 |
| Journal | Differential Geometry and its Application |
| Volume | 86 |
| DOIs | |
| State | Published - Nov 29 2022 |
Scopus Subject Areas
- Analysis
- Geometry and Topology
- Computational Theory and Mathematics
Keywords
- Coadjoint orbit
- Flag manifold
- Homogeneous complex manifold
- Pseudo-Kähler manifold
- Unitary group