Abstract
The Koopman–von Neumann equation describes the evolution of a complex-valued wavefunction corresponding to the probability distribution given by an associated classical Liouville equation. Typically, it is defined on the whole Euclidean space. The investigation of bounded domains, particularly in practical scenarios involving quantum-based simulations of dynamical systems, has received little attention so far. We consider the Koopman–von Neumann equation associated with an ordinary differential equation on a bounded domain whose trajectories are contained in the set’s closure. Our main results are the construction of a strongly continuous semigroup together with the existence and uniqueness of solutions of the associated initial value problem. To this end, a functional-analytic framework connected to Sobolev spaces is proposed and analyzed. Moreover, the connection of the Koopman–von Neumann framework to transport equations is highlighted.
Original language | English |
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Article number | 395302 |
Journal | Journal of Physics A: Mathematical and Theoretical |
Volume | 57 |
Issue number | 39 |
Early online date | 11 Sept 2024 |
DOIs | |
Publication status | E-pub ahead of print - 11 Sept 2024 |
Keywords
- Koopman-von Neumann mechanics
- Perron-Frobenius-Sobolev space
- dynamical systems
- evolution equations
- transfer operators
ASJC Scopus subject areas
- Statistical and Nonlinear Physics
- General Physics and Astronomy
- Statistics and Probability
- Mathematical Physics
- Modelling and Simulation