- Autor(in)
- Referenz
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10 Balesou, R., "Statistical Mechanics of Charged Particles", London, New York, Sydney 1963.
11 Faddeyeva, V. N., u. N. M. Terentev, "Tables of Values of the Function ω (z) for Complex Argument", Pergamon 1961.
12 Fried, B. D., u. R. W. Gould, Phys. of Fluids 4 (1961) 139.
13 Rowlinson, J. S., Contemp. Phys. 5 (1964) 359.
14 Zwanzig, R., u. R. D. Mountain, J. chem. Physics 43 (1965) 4464.
1 Zwanzig, R., Physic. Rev. 144 (1966) 170.
2 Zwanzig, R., Physic. Rev. 156 (1967) 190.
3 Zwanzig, R., u. R. Nossal, Physic. Rev. 157 (1967) 120.
4 Quaas, P., K. Voss u. P. Ziesche, Acta Phys. Hung. 24 (1968) 45.
5 Pompe, W., u. K. Voss, Ann. Physik 18 (1966) 194.
6 Mori, H., Progr. Theor. Phys. 33 (1965) 423.
7 Bahr, U., P. Quaas u. K. Voss, Z. Naturforsch. 23a (1968), 638.
8 van Kampen, N. G., Physica 23 (1957) 641.
9 Case, K. M., Ann. Physics (NY) 7 (1959) 349.
Fried, B. D., u. S. D. Conte, "The Plasma Dispersion Function", Academic Press N. Y. 1961.
- Seitenbereich
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0303 - 0311
- Zusammenfsg.
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Outgoing from the VLASOV-equation and a modified VLASOV-equation the dispersion relations ω = ω (f) of quasi-particles in dense classical systems are investigated. Based on MAXWELL'S equilibrium distribution all eigenvalues ω of the linearized equations have a negative imaginary part so that the corresponding quasi-particles have finite lifetime. In the limit f → 0 the velocity of sound is determined as criterion for the validity of the obtained dispersion relations.
- Artikel-Typen
- Forschungsartikel