Geometric Quantization and No Go Theorems
dg-ga
2008-02-03 v1 Differential Geometry
Abstract
A geometric quantization of a K\"{a}hler manifold, viewed as a symplectic manifold, depends on the complex structure compatible with the symplectic form. The quantizations form a vector bundle over the space of such complex structures. Having a canonical quantization would amount to finding a natural (projectively) flat connection on this vector bundle. We prove that for a broad class of manifolds, including symplectic homogeneous spaces (e.g., the sphere), such connection does not exist. This is a consequence of a ``no go'' theorem claiming that the entire Lie algebra of smooth functions on a compact symplectic manifold cannot be quantized, i.e., it has no essentially nontrivial finite-dimensional representations.
Cite
@article{arxiv.dg-ga/9703010,
title = {Geometric Quantization and No Go Theorems},
author = {Viktor L. Ginzburg and Richard Montgomery},
journal= {arXiv preprint arXiv:dg-ga/9703010},
year = {2008}
}
Comments
AMS-LaTeX, 10 pages