On the Inverse Mapping of the Formal Symplectic Groupoid of a Deformation Quantization

In the first part of this article we provide a geometrically oriented approach to the theory of orbispaces originally introduced by G. Schwarz and W. Chen. We explain the notion of a vector orbibundle and characterize the good sections of a reduced vector orbibundle as the smooth stratified sections

In the paper, we establish some conditions which ensure one of the following: (i) the existence of the pullback of the quantization bundle of a Poisson manifold to a quantization bundle of a symplectic leaf, (ii) the existence of the projection of a quantization bundle from a presymplectic realizati

The quantum mechanics of some maps have been studied as means to understand the implications of "chaos" in quantum systems. Maps exhibiting highly complex classical dynamics can also be quantized. Linear maps that are classically unstable are simple systems that can be exactly solved, and here we do