On solutions to the Vlasov equations
UDC
517.968.7DOI:
https://doi.org/10.31429/vestnik-18-3-8-14Abstract
In this study we consider the mixed boundary value problem for the Vlasov-Poisson equations in an infinite cylinder, a problem describing the evolution of the density distribution of ions and electrons in a high temperature plasma under an external magnetic field. We examine the way to find a solution presented by Skubachevskii in his articles. We then present the alternative way consisting in the following. The system is reduced to an inhomogeneous form by replacing the unknown distribution function. After this, the fixed-point iteration method is used twice. First, we find function $f^{\beta }( x,p,t )$ as the limit for the sequence $f_{n}^{\beta }(x,p,t )$, then we use it to construct the solution $\varphi ( x,t )$ as the limit for $\varphi_{n}(x,t)$. The found classical solution for which the supports of the charged-particle density distributions are at a distance from the cylindrical boundary is shown to exist and to be unique in some neighbourhood of the stationary solution.
Keywords:
fixed-point iteration, Vlasov-Poisson equations, integro-differential equationsReferences
- Vlasov A.A. O vibratsionnykh svoystvakh elektronnogo gaza [On the vibrational properties of an electron gas]. Zhurnal eksperimentalnoy i tekhnicheskoy fiziki [Journal of Experimental and Technical Physics], 1938, vol. 8, no. 3, pp. 444–470. (In Russian)
- Skubachevskii A.L. smeshannye zadachi dlya uravneniy Vlasova-Puassona v poluprostranstve [Initial-boundary value problems for the Vlasov-Poisson equations in a half-space]. Trudy Matematicheskogo instituta imeni V.A. Steklova [Proceedings of the Steklov Institute of Mathematics], 2013, vol. 283, pp. 197–225. (In Russian)
- Skubachevskii A.L. Uravneniya Vlasova-Puassona dlya dvukhkomponentnoy plazmy v odnorodnom magnitnom pole [Vlasov–Poisson equations for a two-component plasma in a homogeneous magnetic field]. Uspekhi Matematicheskikh Nauk [Russian Mathematical Surveys], 2014, vol. 69, no. 2, pp. 291–330. (In Russian)
- Skubachevskii A.L., Tsuzuki Y. Klassicheskie resheniya uravneniy Vlasova-Puassona s vneshnim magnitnym polem v poluprostranstve [Classical solutions of the Vlasov–Poisson equations with external magnetic field in a half-space]. Zhurnal vychislitel'noy matematiki i matematicheskoy fiziki [Computational Mathematics and Mathematical Physics], 2017, vol.57, no. 3, pp. 541–557. (In Russian)
- Belyaeva Y.O., Skubachevskii A.L. O klassicheskikh resheniyakh pervoy smeshannoy zadachi dlya sistemy Vlasova-Puassona v beskonechnom tsilindre [On classical solutions to the first mixed problem for the Vlasov–Poisson system in an infinite cylinder]. Doklady Akademii Nauk [Doklady Mathematics], vol. 99, no. 1, pp. 87–90. (In Russian)
- Garabedian P.R. Partial differential equations. New York, John Wiley & Sons, inc., 1967. (In Russian)
- Gilbarg D., Trudinger N. Ellipticheskiye differentsialnyye uravnenia s chastnymi proizvodnymi vtorogo poryadka [Elliptic partial differential equations of the second order]. Nauka, Moscow, 1989. (In Russian)
Downloads
Submitted
Published
How to Cite
Copyright (c) 2021 Zhuravlev I.V., Dovbush A.N.
This work is licensed under a Creative Commons Attribution 4.0 International License.
