Triangular dynamical r-matrices and quantization
Abstract
We provide a general study for triangular dynamical r-matrices using Poisson geometry. We show that a triangular dynamical r-matrix always gives rise to a regular Poisson manifold. Using the Fedosov method, we prove that non-degenerate (i.e., the corresponding Poisson manifolds are symplectic) triangular dynamical r-matrices (over and valued in ) are quantizable, and the quantization is classified by the relative Lie algebra cohomology . We also generalize this quantization method to splittable triangular dynamical r-matrices, which include all the known examples of triangular dynamical r-matrices. Finally, we arrive a conjecture that the quantization for an arbitrary triangular dynamical r-matrix is classified by the formal neighbourhood of this r-matrix in the modular space of triangular dynamical r-matrices. The dynamical r-matrix cohomology is introduced as a tool to understand such a modular space.
Keywords
Cite
@article{arxiv.math/0005006,
title = {Triangular dynamical r-matrices and quantization},
author = {Ping Xu},
journal= {arXiv preprint arXiv:math/0005006},
year = {2007}
}
Comments
LaTex, 43 pages, final version, typos corrected and references updated. Advances in Math, to appear