Object

Title: Noncharacteristic mixed problems for ideal incompressible magnetohydrodynamics

Creator:

Zajaczkowski, W. M.

Date issued/created:

1987

Resource Type:

Journal

Publisher:

Polish Scientific Publishers IFTR

Place of publishing:

Warszawa

Description:

Od Vol. 43, issue 1 (1991) wyd.: Polish Scientific Publishers = PWN ; Od Vol. 50, issue 4 (1998) wyd.: Agencja Reklamowo-Wydawnicza A. Grzegorczyk ; Od Vol. 53, issue 4/5 (2001) wyd: PAS. IFTR ; [1], 425-559 s. ; 24 cm

Abstract:

The equations of magnetohydrodynamics describing a motion of an ideal incompressible and infinite conductive fluid are considered. These equations are replaced by two kinds of equations: a system of symmetric hyperbolic equations and a Poisson equation. Using the results about the existence of solutions of symmetric hyperbolic equations, the existence of local solutions to the problems is proved by the method of successive approximations. These solutions belong to such spaces that equations of MHD are satisfied classically.

Relation:

Archives of Mechanics

Volume:

39

Issue:

5

Start page:

461

End page:

483

Resource Identifier:

oai:rcin.org.pl:87425

Source:

IPPT PAN, call no. P.262 ; click here to follow the link

Language:

eng

Language of abstract:

eng ; pol ; rus

Rights:

Creative Commons Attribution BY 4.0 license

Terms of use:

Copyright-protected material. [CC BY 4.0] May be used within the scope specified in Creative Commons Attribution BY 4.0 license, full text available at: ; -

Digitizing institution:

Institute of Fundamental Technological Research of the Polish Academy of Sciences

Original in:

Library of the Institute of Fundamental Technological Research of The Polish Academy of Sciences

Projects co-financed by:

Operational Program Digital Poland, 2014-2020, Measure 2.3: Digital accessibility and usefulness of public sector information; funds from the European Regional Development Fund and national co-financing from the state budget. ;

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