Quantum equations of motion and the Liouville equation

In this paper I derive exact expressions for the remainder gotten when only a finite number of terms are kept in the semi-classical expansion for the quantum Liouville equation. Each expansion is a power series in h, but with coefficients that depend on fr, and so it is not an ordinary semi-classica

## Abstract We present an asymptotic analysis of the quantum Liouville equation with respect to the Planck's constant, which models the temporal evolution of the (quasi)distribution of an ensemble of electrons under the action of a potential. We consider two cases: firstly a smooth potential, and s

A relation between the coupling constants of interacting nonlinear scalar field ~(Xo, xl ) and a spinor one ~(Xo, Xl ), Lin t = -g 2 /2 e 2~ -g' e e ~ was established. This relation leads to the finite series of perturbation theory for the dynamical variable e -~. In the classical limit ~ -+ 0 the c