Feynman Path Integral and Landau Density Matrix in Probability Representation of Quantum States

preprint OA: closed CC-BY-4.0
🔓 Open OA copy View at publisher

Abstract

Using construction of probability distributions describing density operators of quantum system states, the relation of Feynman path integral with the time evolution of the density operator (Landau density matrix) (as well as the state wave function) is found. The explicit expression of the probability in terms of the Green function of the Schrödinger equation is obtained. The equation for the Green function determined by arbitrary integral of motion is written. The examples of the probability distributions describing the evolution of the free particle states, as well as of the states of the systems with time dependent integrals of motion (like the oscillator) are discussed.

My notes (saved in your browser only)

Citation neighborhood (no data yet)

We don't have any in-corpus citations linked to this paper yet. This is a recent paper (2025) — citers typically take a year or two to land, and the OpenAlex reference graph may still be filling in.

Source provenance

europepmc
last seen: 2026-05-20T01:45:00.602351+00:00
unpaywall
last seen: 2026-05-28T02:00:01.590549+00:00
License: CC-BY-4.0