2013 , Volume 18, № 3, p.54-79

The questions of construction of difference schemes, which preserve monotonicity of a numerical solution, on uniform and adaptive grids are discussed using the examples for nonlinear scalar equation. Important properties of preservation of constant solution, stationary and moving shocks are shown. A new explanation of generation of nonphysical numerical solutions and the entropy fix are done using the method of differential approximation. An example of a TVD scheme, which increases a number of extremums, is given. A new approach to construction of any explicit two-layer divergence schemes on moving grids is suggested. The predictor-corrector scheme is used for numerical solution of one-dimensional non-stationary shallow water equations. Investigation of scheme properties has been done combined with its numerical testing