T. G. Elizarova, A. A. Zlotnik, O. V. Nikitina, “Modeling of one-dimensional shallow water flows based on regularized equations”, Keldysh Institute preprints, 2011,033, 36 pp.

This article is cited in 4 papers

Modeling of one-dimensional shallow water flows based on regularized equations

T. G. Elizarova^a, A. A. Zlotnik^bcd, O. V. Nikitina^c

^a M. V. Keldysh Institute for Applied Mathematics, Russian Academy of Sciences
^b Higher School of Economic
^c Moscow Power Engineering Institute (Technical University)
^d Russian State Social University

Abstract: For one-dimensional shallow water flows, a version of regularized equations deriving is expounded. The energy equality is proved for them. A corresponding finite-difference scheme is presented and examples of computation of one- dimensional problems known in literature are given encluding a disintegration of discontinuity (dam break) in a channel with a wall, subcritical, transcritical, supercritical flows over a hump, basins at rest, double rarefaction wave over a step, tidal flow over a beach and a disintegration of discontinuity in a horizontal and slanted dry bed channels. Convergence and exactness of the finite-difference scheme are analyzed.

Keywords: one-dimensional shallow water flows, regularized equations, energy equality, numerical modeling.