Poisson Hopf algebra deformations of Lie Hamilton systems

Assaisonnement/Épices, Fruits, Poisson, Charcuterie, Produits Laitiers, Légumes, Fruits de Mer, Viande.. Légumes Fruits Viande Poisson Frutis de

 International Journal of Electrical Power and Energy Systems Engineering.  International Journal of Electrical, Computer, and

(b2) When the equilibrium lies in the zone with trace zero and the other trace is negative (respectively, positive), system (4) has a globally attractive (respectively, repulsive)

While the preceding papers mostly considered abstract properties of algebras of quotients, our main objective is to compute Q m (L) for some Lie algebras L. Specifically, we

One can consider a Jacobi manifold as a generalized phase-space and the Lie algebra of infinitesimal automorphisms as the algebra of symmetries of this phase-space.. Then the

This non- trivial response of the phase under gauge transformations causes a deformation of the corresponding Lie-algebra commutators and leads to the appearance of central

As already said, although surface deformations appear as a constraint algebra, under which one might expect all the physical states on the horizon to be singlets, quantum anomalies

Keywords: Infinite-dimensional Lie algebras, Virasoro and W ∞ symmetries, Berezin and geo- metric quantization, coherent states, operator symbols, classical limit, Poisson