QUEER POISSON BRACKETS DANIEL BELTITA

In this work, we are interested in the controllability of Vlasov-Poisson systems in the presence of an external force field (namely a bounded force field or a magnetic field), by

We will show, in particular, that commutativity of generating functions of the classical integrals t r(T (λ)) k (or t r(L(λ)) k ) with respect to the both linear and second

The formality theorem for Hochschild chains of the algebra of functions on a smooth manifold gives us a version of the trace density map from the zeroth Hochschild homology of

a) Suppose that the bottom space is an abstract Wiener space equipped with the Ornstein- Uhlenbeck structure, then Meyer inequalities hold on all tensor products of the bottom

In this paper, the proof relies on an estimate that can be roughly described as follows (see Proposition 3.1 or Lemma 3.3 for a more precise statement): the probability of D

This particular random Poisson measure is used in Section 3 to realize continuous quantum trajectories and discrete quantum trajectories in a same probability space and to prove

Two conjectures are proposed at the end of this paper , one for the holomorphic multi-vector fields on nonsingular toric varieties, and the other for the Poisson cohomology

As an application, I show with an example how the quantisation of the dual of the Lie algebroid associated to a Poisson manifold can lead to a quantisation of the Poisson