Strict quantization of coadjoint orbits
Abstract
A strict quantization of a compact symplectic manifold on a subset , containing 0 as an accumulation point, is defined as a continuous field of -algebras , with , and a set of continuous cross-sections for which . Here for all , whereas for one requires that in norm. We discuss general conditions which guarantee that a (deformation) quantization in a more physical sense leads to one in the above sense. Using ideas of Berezin, Lieb, Simon, and others, we construct a strict quantization of an arbitrary integral coadjoint orbit of a compact connected Lie group , associated to a highest weight . Here , so that , , and is defined as the -algebra of all matrices on the finite-dimensional Hilbert space carrying the irreducible representation with highest weight . The quantization maps are constructed from coherent states in , and have the special feature of being positive maps.
Cite
@article{arxiv.math-ph/9807027,
title = {Strict quantization of coadjoint orbits},
author = {N. P. Landsman},
journal= {arXiv preprint arXiv:math-ph/9807027},
year = {2009}
}
Comments
13 pages