Higher order compact algorithms are developed for the numerical simulation of wave propagation by using the concept of a discrete dispersion relation. The dispersion relation is the imprint of any linear operator in space-time. The discrete dispersion relation is derived from the continuous dispersion relation by examining the process by which locally plane waves propagate through a chosen grid. The exponential structure of the discrete dispersion relation suggests an efficient splitting of convective and diffusive terms for dissipative waves. Fourth- and eighth-order convection schemes are examined that involve only three or five spatial grid points. These algorithms are subject to the same restrictions that govern the use of dispersion re...
AbstractA linearized implicit finite difference method is devised for K(n,n). The stability and accu...
25 pages, 12 figures, 51 references. Other authors papers can be downloaded at http://www.lama.univ-...
In several recent works, we developed a new second order, A-stable approach to wave propagation prob...
Two interesting numerical methods for treating convective transport are investigated: the dispersion...
A description is given of a number of numerical schemes to solve an evolution equation that arises w...
This paper presents a review of high-order and optimized finite-difference methods for numerically s...
Most computational fluid dynamics (CFD) schemes are not adequately accurate for solving aeroacoustic...
Important characteristics of the aeroacoustic wave propagation are mostly encoded in their dispersio...
A technique for analyzing dispersion properties of numerical schemes is proposed. The method is able...
In developing suitable numerical techniques for computational aero-acoustics, the dispersion-relatio...
Various problems involving the interplay of asymptotics and numerics in the analysis of wave propaga...
Computational aeroacoustics often use finite difference schemes optimized to require relatively few ...
In order to embark on the development of numerical schemes for stiff problems, we have studied a mod...
The governing equations of the acoustic problem are the compressible Euler equations. The discretiza...
Similar to surface waves propagating at the interface of two fluid of different densities (like air ...
AbstractA linearized implicit finite difference method is devised for K(n,n). The stability and accu...
25 pages, 12 figures, 51 references. Other authors papers can be downloaded at http://www.lama.univ-...
In several recent works, we developed a new second order, A-stable approach to wave propagation prob...
Two interesting numerical methods for treating convective transport are investigated: the dispersion...
A description is given of a number of numerical schemes to solve an evolution equation that arises w...
This paper presents a review of high-order and optimized finite-difference methods for numerically s...
Most computational fluid dynamics (CFD) schemes are not adequately accurate for solving aeroacoustic...
Important characteristics of the aeroacoustic wave propagation are mostly encoded in their dispersio...
A technique for analyzing dispersion properties of numerical schemes is proposed. The method is able...
In developing suitable numerical techniques for computational aero-acoustics, the dispersion-relatio...
Various problems involving the interplay of asymptotics and numerics in the analysis of wave propaga...
Computational aeroacoustics often use finite difference schemes optimized to require relatively few ...
In order to embark on the development of numerical schemes for stiff problems, we have studied a mod...
The governing equations of the acoustic problem are the compressible Euler equations. The discretiza...
Similar to surface waves propagating at the interface of two fluid of different densities (like air ...
AbstractA linearized implicit finite difference method is devised for K(n,n). The stability and accu...
25 pages, 12 figures, 51 references. Other authors papers can be downloaded at http://www.lama.univ-...
In several recent works, we developed a new second order, A-stable approach to wave propagation prob...