Random waves in a classical nonlinear Grassmann field. II. Scattering by zero point noise and the transition to Fermi statistics
DOI10.1016/0378-4371(85)90079-2zbMath0591.76138OpenAlexW1512648721MaRDI QIDQ1075197
S. J. Putterman, Paul H. Roberts
Publication date: 1985
Published in: Physica A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0378-4371(85)90079-2
scattering processGrassmann algebrathermal wavesstable configurationclassical equations with added stable zero-point actionclassical kinetic equationscoupled Grassmann and commuting fieldsFermi distribution for the Grassmann fieldFermi statistics resultmagnitude of the separate zero-point actionsPlanck distribution for the commuting fieldzero-point motion
Rarefied gas flows, Boltzmann equation in fluid mechanics (76P05) Classical equilibrium statistical mechanics (general) (82B05) Quantum equilibrium statistical mechanics (general) (82B10)
Cites Work
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- Classical nonlinear waves in dispersive nonlocal media, and the theory of superfluidity
- Random waves in a classical nonlinear Grassmann field. I. Boltzmann equation and scalar field coupling
- Dynamical systems and microphysics. Foreword by Louis de Broglie
- Random nonlinear electromagnetic waves in vacuo
- Absorption of sound by sound
- Semidispersive wave systems
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