Microfield distribution in semiclassical plasma
Keywords:
Microfield distribution function, plasma microfield.Abstract
In this article the calculation and analysis of the plasma microfield distribution function of nonideal dense plasma are presented. Plasma particles interact via the effective potential which takes into account of the quantum effect of diffraction and the screening effect. Method of Iglesias was used for calculation of the microfield distribution function of the ionic component. The advantage of this method is that the distribution function is exactly expressed in terms of a two-body function and does not require knowledge of many-body functions, this fact significantly simplifies the problem. Results were compared with the results obtained on the basis of other models. The discussion and conclusion are presented.References
1 Griaznov V.К. et al. Thermophysical
properties of the working gas of the gas-phase
nuclear reactors. – М.: Atomizdat, 1980. – 304 p.
2 Kudrin L.P. Statistical physics of plasma.
– М.: Atomizdat, 1974. – 496 p.
3 Holtsmark J. // Ann. Phys. (Leipzig). –
1919. – Vol. 58, № 5. – P. 577-583.
4 Ecker G., Müller K.G. // Zs. Phys. – 1958.
– Vol. 153. – P. 317-323.
5 Iglesias C.A. and Hooper C.F. // Phys.
Rev. A – 1982. – Vol. 25, № 5. – P. 1049.
6 Iglesias C.A. Integral-equation method
for electric microfield distribution // Phys. Rev.
A – 1983. – Vol. 27, № 5. – P. 2705-2709.
7 Ramazanov T.S., Dzhumagulova K.N.
Effective screened potentials of strongly
coupled semiclassical plasma // Phys. Plasmas. –
2002. – Vol. 9, № 9. – P. 3758-3761.
T.S. Ramazanov, M.C. Jelbuldina, К.N. Dzhumagulova 143
International Journal
properties of the working gas of the gas-phase
nuclear reactors. – М.: Atomizdat, 1980. – 304 p.
2 Kudrin L.P. Statistical physics of plasma.
– М.: Atomizdat, 1974. – 496 p.
3 Holtsmark J. // Ann. Phys. (Leipzig). –
1919. – Vol. 58, № 5. – P. 577-583.
4 Ecker G., Müller K.G. // Zs. Phys. – 1958.
– Vol. 153. – P. 317-323.
5 Iglesias C.A. and Hooper C.F. // Phys.
Rev. A – 1982. – Vol. 25, № 5. – P. 1049.
6 Iglesias C.A. Integral-equation method
for electric microfield distribution // Phys. Rev.
A – 1983. – Vol. 27, № 5. – P. 2705-2709.
7 Ramazanov T.S., Dzhumagulova K.N.
Effective screened potentials of strongly
coupled semiclassical plasma // Phys. Plasmas. –
2002. – Vol. 9, № 9. – P. 3758-3761.
T.S. Ramazanov, M.C. Jelbuldina, К.N. Dzhumagulova 143
International Journal
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Published
2012-06-30
How to Cite
Ramazanov, T. S., Jelbuldina, M. S., & Dzhumagulova, K. N. (2012). Microfield distribution in semiclassical plasma. International Journal of Mathematics and Physics, 3(2), 140–143. Retrieved from https://ijmph.kaznu.kz/index.php/kaznu/article/view/57
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Astronomy and Space Research
