1. Phase-space gaussian ensemble quantum camouflage
- Author
-
Bernardini, Alex E. and Bertolami, Orfeu
- Subjects
Quantum Physics ,Mathematical Physics - Abstract
Extending the phase-space description of the Weyl-Wigner quantum mechanics to a subset of non-linear Hamiltonians in position and momentum, gaussian functions are identified as the quantum ground state. Once a Hamiltonian, $H^{W}(q,\,p)$, is constrained by the $\partial ^2 H^{W} / \partial q \partial p = 0$ condition, flow properties for generic $1$-dim systems can be analytically obtained in terms of Wigner functions and Wigner currents. For gaussian statistical ensembles, the exact phase-space profile of the quantum fluctuations over the classical trajectories are found, so to interpret them as a suitable Hilbert space state configuration for confronting quantum and classical regimes. In particular, a sort of {\em quantum camouflage} where the stationarity of classical statistical ensembles can be camouflaged by the stationarity of gaussian quantum ensembles is identified. Besides the broadness of the framework worked out in some previous examples, our results provide an encompassing picture of quantum effects on non-linear dynamical systems which can be interpreted as a first step for finding the complete spectrum of non-standard Hamiltonians., Comment: 9 pages. Based on the work presente by by A.E.B. at DICE 2024 Spacetime - Matter - Quantum Mechanics ..., 16th - 20th September 20124, Castiglioncello, Italy
- Published
- 2024