A TVD principle and conservative TVD schemes for adaptive Cartesian grids

The second-order extenmon of Godunov's method for hyperbohc conservatton laws, known as MUSCL schemes, is studied in thxs paper. We present a new type of Eulenan MUSCL scheme and oscillation-free algorithms The mtercell flux is computed from difference approximations of characteristic equations with

The Saint Venant equations for modelling flow in open channels are solved in this paper, using a variety of total variation diminishing (TVD) schemes. The performance of second-and third-order-accurate TVD schemes is investigated for the computation of free-surface flows, in predicting dam-breaks an

In this paper, we present a two-step, component-wise TVD scheme for nonlinear, hyperbolic conservation laws, which is obtained by combining the schemes of Mac Cormack and Warming-Beam. The scheme does not necessitate the characteristic decompositions of the usual TVD schemes. It employs component-wi

A quantitative analysis of solutions to the Euler equations of fluid dynamis with the MUSCL, ENO-Harten, and efficient ENO-Shu algorithms is performed. Investigations of different test problems in one and two dimensions are presented. These are chosen as to model the shock-turbulence interaction in

A nested multi-grid solution algorithm has been developed for an adaptive Cartesian/Quad grid viscous flow solver. Body-fitted adaptive Quad (quadrilateral) grids are generated around solid bodies through 'surface extrusion'. The Quad grids are then overlapped with an adaptive Cartesian grid. Quadtr