V. M. Goloviznin, D. Yu. Gorbachev, A. M. Kolokolnikov, P. A. Maiorov, P. A. Maiorov, B. A. Tlepsuk, “Implicit and time reversible CABARET schemes for quasilinear shallow water equations”, Num. Meth. Prog., 17:4 (2016), 402

Numerical methods and programming

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Numerical methods and programming, 2016, Volume 17, Issue 4, Pages 402–414 (Mi vmp846)

Implicit and time reversible CABARET schemes for quasilinear shallow water equations

V. M. Goloviznin^a, D. Yu. Gorbachev^b, A. M. Kolokolnikov^b, P. A. Maiorov^b, P. A. Maiorov^b, B. A. Tlepsuk^b

^a Nuclear Safety Institute, RAS, Moscow
^b Lomonosov Moscow State University, Faculty of Computational Mathematics and Cybernetics

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Abstract: A new implicit unconditionally stable scheme for the one-dimensional shallow water equations is proposed. This implicit scheme retains all the features of the explicit CABARET (Compact Accurately Boundary Adjusting-REsolution Technique) difference scheme. Dissipative and dispersion properties of this new scheme are analyzed; an algorithm of its numerical solution is discussed. Some examples of solving the Riemann problem are considered.

Keywords: CABARET scheme, shallow water equations, conservative schemes, time reversible schemes, numerical simulation.

Received: 25.08.2016

UDC: 519.63

Language: Russian

Citation: V. M. Goloviznin, D. Yu. Gorbachev, A. M. Kolokolnikov, P. A. Maiorov, P. A. Maiorov, B. A. Tlepsuk, “Implicit and time reversible CABARET schemes for quasilinear shallow water equations”, Num. Meth. Prog., 17:4 (2016), 402–414

Citation in format AMSBIB

\Bibitem{GolGorKol16}

\by V.~M.~Goloviznin, D.~Yu.~Gorbachev, A.~M.~Kolokolnikov, P.~A.~Maiorov, P.~A.~Maiorov, B.~A.~Tlepsuk

\paper Implicit and time reversible CABARET schemes for quasilinear shallow water equations

\jour Num. Meth. Prog.

\yr 2016

\vol 17

\issue 4

\pages 402--414

\mathnet{http://mi.mathnet.ru/vmp846}

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Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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