Optimized compact finite difference schemes with maximum resolution

For finite difference schemes of compact forni on noniiniform grids approximating w t h order two-point boiindary value problenia stabilit!-inequulitiea are proved irliicll use ti norm anitlogotis t o the Gprncm-norm in the ease of milltistep niethocts. TIM restilts are appliecl to a nitmber of fini

A general framework is derived which leads to generic expressions of discrete dispersion relationships for inertia-gravity and Rossby waves, valid for every finite difference scheme and every type of grid. These relationships are used to investigate the performance of fourth-order and sixth-order co

This paper presents a family of finite difference schemes for the first and second derivatives of smooth functions. The schemes are Hermitian and symmetric and may be considered a more general version of the standard compact (Padé) schemes discussed by Lele. They are different from the standard Padé

We consider high-order compact (HOC) schemes for quasilinear parabolic partial differential equations to discretise the Black-Scholes PDE for the numerical pricing of European and American options. We show that for the heat equation with smooth initial conditions, the HOC schemes attain clear fourth