Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave

Basombrio, F.G.

doi:10.1088/0032-1028/15/10/010

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Basombrio, F.G. "Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave" (1973) Plasma Physics. 15(10):1043-1052

https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_00321028_v15_n10_p1043_Basombrio

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Abstract:

Stationary solutions are found for the non-neutral two fluid plasma model in the absence of magnetic field. Using a perturbation method, the solutions are analyzed in the neighbourhood of the singular points in the general electrostatic case with pi=0. The existence and uniqueness of a solitary wave is then shown for the more restricted, quasi-neutral model with y=2. Ranges of validity are given for this case. A result of this study is that no shock can exist within the restricted hypothesis of the quasi-neutral model. Finally, physical examples are given for some typical plasma cases. The dimension of the solitary wave is of the order of the Debye length.

Registro:

Documento:	Artículo
Título:	Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave
Autor:	Basombrio, F.G.
Filiación:	Pabellon I, Ciudad Univ., Nunez-Buenos Aires, Argentina
Año:	1973
Volumen:	15
Número:	10
Página de inicio:	1043
Página de fin:	1052
DOI:	http://dx.doi.org/10.1088/0032-1028/15/10/010
Título revista:	Plasma Physics
ISSN:	00321028
Registro:	https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_00321028_v15_n10_p1043_Basombrio

Referencias:

Auer, PL, Hurwitz, H, Kilb, RW, (1962) Phys. Fluids, 5 (3), p. 298
Baños, A, Vernon, AR, (1960) Nuovo Cim., 15 (2), p. 269
Bardotti, G, Segre, SE, (1970) Plasma Phys., 12 (4), p. 247
Basombrio, FG, (1970); Basombrio, FG, (1972); Biskamp, D, Parkinson, D, (1969), p. 191; Coffey, TP, (1970) Phys. Fluids, 13 (5), p. 1249
Coffey, TP, (1970) Phys. Fluids, 13 (5), p. 1249
Dreicer, H, (1959) Phys. Rev., 115, p. 238
Gardner, GS, Goertzel, H, Grad, H, Morawetz, CS, Rose, MH, Rubin, H, (1968), 31, p. 230; Germain, P, (1962) Cahier Phys., 142, p. 243
Germain, P, (1965); Germain, P, Soubbaramayer, (1962) C.R. Acad. Sci., Paris, 255, p. 1856
Hain, K, Lust, R, Schluter, A, (1960) Rev. Mod. Phys., 32, p. 967
Morawetz, CS, (1959); Morton, KW, (1962) J. Fluid Mech., 14 (3), p. 369
Morton, KW, Finite Amplitude Compression Waves in a Collision-Free Plasma (1964) Physics of Fluids, 7 (11), p. 1800
Peyret, R, (1964) C.R. Acad. Sci. París, 258, p. 1973
Peyret, R, (1964) C.R. Acad. Sci. París, 258, p. 3178
Soubbaramayer, (1962) C.R. Acad. Sci. París, 255, p. 1691

Citas:

---------- APA ----------

(1973) . Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave. Plasma Physics, 15(10), 1043-1052.
http://dx.doi.org/10.1088/0032-1028/15/10/010

---------- CHICAGO ----------

Basombrio, F.G. "Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave" . Plasma Physics 15, no. 10 (1973) : 1043-1052.
http://dx.doi.org/10.1088/0032-1028/15/10/010

---------- MLA ----------

Basombrio, F.G. "Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave" . Plasma Physics, vol. 15, no. 10, 1973, pp. 1043-1052.
http://dx.doi.org/10.1088/0032-1028/15/10/010

---------- VANCOUVER ----------

Basombrio, F.G. Stationary electrostatic solutions for a non-neutral two fluid model of a plasma quasi-neutral solitary wave. 1973;15(10):1043-1052.
http://dx.doi.org/10.1088/0032-1028/15/10/010