High-order Compact Schemes for Nonlinear Dispersive Waves

matically ''jump'' to local ones as discontinuities are encountered. Hence the schemes are nonlinear and Gibbs phe- We develop here compact high-order accurate nonlinear schemes for discontinuities capturing. Such schemes achieve high-order spa-nomenon is avoided. Two propositions have been proved,

The weighted technique is introduced in the compact high-order nonlinear schemes (CNS) and three fourth-and fifth-order weighted compact nonlinear schemes (WCNS) are developed in this paper. By Fourier analysis, the dissipative and dispersive features of WCNS are discussed. In view of the modified w

Spatial finite difference and three-level time schemes for the Korteweg-de Vries (KdV) and related equations are studied. The stability conditions are derived from a uniform framework based on the Schur--Cohn theory of simple Von Neumann polynomials. Numerical results and comparisons with other meth