On the relaxation rate spectrum of phonons
- 17 January 1972
- journal article
- Published by IOP Publishing in Journal of Physics C: Solid State Physics
- Vol. 5 (1) , 5-14
- https://doi.org/10.1088/0022-3719/5/1/004
Abstract
The nature of the spectrum of the normal processes collision operator for phonons is studied in the framework of the theory of Hilbert space. It is shown that in the limit V to infinity the continuous part of the spectrum extends down to the value zero. A rigorous proof regarding the absolutely continuous part of the spectrum of the collision operator in the gas model approximation is given. The only eigenvalue is zero and the continuum covers the range (0, infinity ).Keywords
This publication has 5 references indexed in Scilit:
- Relaxation Spectrum of Phonons: A Solvable ModelJournal of Mathematical Physics, 1971
- Phonon Boltzmann Equation and Second Sound in SolidsPhysical Review B, 1970
- Linear Hard-Sphere Gas: Variational Eigenvalue Spectra of the Energy KernelThe Journal of Chemical Physics, 1970
- Solution of the Linearized Phonon Boltzmann EquationPhysical Review B, 1966
- On Fundamental Equations of Spatially Independent Problems in Neutron Thermalization TheoryProgress of Theoretical Physics, 1964