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| Reference : IFFT-equivariant quantizations |
| Scientific journals : Article | |||
| Physical, chemical, mathematical & earth Sciences : Physics Physical, chemical, mathematical & earth Sciences : Mathematics | |||
| http://hdl.handle.net/2268/91239 | |||
| IFFT-equivariant quantizations | |
| English | |
| Boniver, Fabien [Université de Liège - ULg > Département de Mathématique > Département de Mathématique > >] | |
Mathonet, Pierre  [Université de Liège - ULg > Département de mathématique > Département de mathématique >] | |
| Apr-2006 | |
| Journal of Geometry and Physics | |
| Elsevier Science Bv | |
| 56 | |
| 4 | |
| 712-730 | |
| International | |
| 0393-0440 | |
| Amsterdam | |
| [en] Lie subalgebras of vector fields ; Modules ofdifferential operators ; Casimir operators ; Symbol calculus ; Equivariant quantization | |
| [en] The existence and uniqueness of quantizations that are equivariant with respect to conformal and projective Lie algebras of vector fields were recently obtained by Duval, Lecomte and Ovsienko. In order to do so, they computed spectra of some Casimir operators. We give an explicit formula for those spectra in the general framework of IFFT-algebras classified by Kobayashi and Nagano. We also define tree-like subsets of eigenspaces of those operators in which eigenvalues can be compared to show the existence of IFFT-equivariant quantizations. We apply our results to prove the existence and uniqueness of quantizations that are equivariant with respect to the infinitesimal action of the symplectic (resp. pseudo-orhogonal) group on the symplectic (resp. pseudo-orthogonal) Grassmann manifold. | |
| Researchers | |
| http://hdl.handle.net/2268/91239 | |
| 10.1016/j.geomphys.2005.04.014 |
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