Publication detail
Finite volume evolution Galerkin methods for Euler equations of gas dynamics
LUKÁČOVÁ, M. MORTON, K. WARNECKE, G.
English title
Finite volume evolution Galerkin methods for Euler equations of gas dynamics
Type
journal article - other
Language
en
Original abstract
The aim of this paper is a derivation of a new multidimensional high-resolution finite volume evolution Galerkin method for system of the Euler equations of gas dynamics. Instead of solving one-dimensional Riemann problems in directions normal to cell interfaces the finite volume evolution Galerkin schemes are based on a genuinely multidimensional approach.
English abstract
The aim of this paper is a derivation of a new multidimensional high-resolution finite volume evolution Galerkin method for system of the Euler equations of gas dynamics. Instead of solving one-dimensional Riemann problems in directions normal to cell interfaces the finite volume evolution Galerkin schemes are based on a genuinely multidimensional approach.
Keywords in English
hyperbolic systems of conservation laws, Euler equations, genuinely multidimensional schemes, evolution Galerkin methods
RIV year
2002
Released
01.09.2002
ISSN
0271-2091
Journal
International Journal for Numerical Methods in Fluids
Volume
2002
Number
40
Pages count
20
BIBTEX
@article{BUT40974,
author="Mária {Lukáčová} and K.W. {Morton} and Gerald {Warnecke},
title="Finite volume evolution Galerkin methods for Euler equations of gas dynamics",
journal="International Journal for Numerical Methods in Fluids",
year="2002",
volume="2002",
number="40",
month="September",
issn="0271-2091"
}