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Main Authors: Rivas, Alejandro M. F, Vergini, Eduardo G., Ermann, Leonardo, Carlo, Gabriel G.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.15926
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author Rivas, Alejandro M. F
Vergini, Eduardo G.
Ermann, Leonardo
Carlo, Gabriel G.
author_facet Rivas, Alejandro M. F
Vergini, Eduardo G.
Ermann, Leonardo
Carlo, Gabriel G.
contents The question of how classical thermodynamic laws emerge from the underlying quantum substrate lies at the foundations of physics. Here, we examine the validity of the ideal gas law (IGL) for a single quantum particle confined within a two-dimensional cavity. By interpreting the quantum wave function as a probability density analogous to that of an ideal gas, we employ the energy equipartition principle to define the temperature of the quantum state. For the mean pressure we take two definitions, one straightforwardly based on the radiation pressure concept and the other taking advantage of a quasi-orthogonality relation valid for billiard eigenstates. We analyze systems with regular dynamics-the circular and rectangular billiards-and compare them with the classically chaotic Bunimovich stadium. We find that the IGL for the first definition of pressure holds exactly in isotropic systems (as the circular case), while for anisotropic geometries, quantum eigenfunctions generally conform to the IGL only on average, exhibiting meaningful deviations. These deviations are diminished in the presence of chaotic dynamics and for coherent states. This observation is consistent with the Eigenstate Thermalization Hypothesis (ETH). Notably, the second definition of pressure allows for a good matching with the IGL.
format Preprint
id arxiv_https___arxiv_org_abs_2505_15926
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Ideal Gas Law for a Quantum Particle
Rivas, Alejandro M. F
Vergini, Eduardo G.
Ermann, Leonardo
Carlo, Gabriel G.
Quantum Physics
The question of how classical thermodynamic laws emerge from the underlying quantum substrate lies at the foundations of physics. Here, we examine the validity of the ideal gas law (IGL) for a single quantum particle confined within a two-dimensional cavity. By interpreting the quantum wave function as a probability density analogous to that of an ideal gas, we employ the energy equipartition principle to define the temperature of the quantum state. For the mean pressure we take two definitions, one straightforwardly based on the radiation pressure concept and the other taking advantage of a quasi-orthogonality relation valid for billiard eigenstates. We analyze systems with regular dynamics-the circular and rectangular billiards-and compare them with the classically chaotic Bunimovich stadium. We find that the IGL for the first definition of pressure holds exactly in isotropic systems (as the circular case), while for anisotropic geometries, quantum eigenfunctions generally conform to the IGL only on average, exhibiting meaningful deviations. These deviations are diminished in the presence of chaotic dynamics and for coherent states. This observation is consistent with the Eigenstate Thermalization Hypothesis (ETH). Notably, the second definition of pressure allows for a good matching with the IGL.
title Ideal Gas Law for a Quantum Particle
topic Quantum Physics
url https://arxiv.org/abs/2505.15926