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JOURNALS // Doklady Rossijskoj Akademii Nauk. Mathematika, Informatika, Processy Upravlenia // Archive

Dokl. RAN. Math. Inf. Proc. Upr., 2020 Volume 492, Pages 97–100 (Mi danma81)

This article is cited in 12 papers

INFORMATICS

On the existence of a global solution of a hyperbolic problem

O. S. Rozanova, E. V. Chizhonkov

Lomonosov Moscow State University, Moscow, Russian Federation

Abstract: A quasilinear system of hyperbolic equations describing plane one-dimensional relativistic oscillations of electrons in a cold plasma is considered. For a simplified formulation, a criterion for the existence of a global-in-time smooth solution is obtained. For the original system, a sufficient condition for singularity formation is found, and a sufficient condition for the smoothness of the solution within the nonrelativistic period of oscillations is established. In addition, it is shown that arbitrarily small perturbations of the trivial solution lead to the formation of singularities in a finite time. The results can be used to construct and substantiate numerical algorithms for modeling the breaking of plasma oscillations.

Keywords: quasilinear hyperbolic equations, plasma oscillations, loss of smoothness, breaking effect.

UDC: 517.956.35

Presented: E. E. Tyrtyshnikov
Received: 15.09.2019
Revised: 11.03.2020
Accepted: 23.03.2020

DOI: 10.31857/S2686954320030169


 English version:
Doklady Mathematics, 2020, 101:3, 254–256

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