posted on 2013-11-08, 00:00authored byPeter Markowich, Christof Sparber, Thierry Paul
The present work is devoted to the study of dynamical features of
Bohmian measures, recently introduced by the authors. We rigorously prove
that for su ciently smooth wave functions the corresponding Bohmian measure
furnishes a distributional solution of a nonlinear Vlasov-type equation.
Moreover, we study the associated defect measures appearing in the classical
limit. In one space dimension, this yields a new connection between monokinetic
Wigner and Bohmian measures. In addition, we shall study the dynamics
of Bohmian measures associated to so-called semi-classical wave packets.
For these type of wave functions, we prove local in-measure convergence
of a rescaled sequence of Bohmian trajectories towards the classical Hamiltonian flow on phase space. Finally, we construct an example of wave functions
whose limiting Bohmian measure is not mono-kinetic but nevertheless equals
the associated Wigner measure.
History
Publisher Statement
Post print version of article may differ from published version. The final publication is available at springerlink.com; DOI: 10.1007/s00205-012-0528-1