Direct numerical simulations and computational aeroacoustics require an accurate finite difference scheme that has a high order of truncation and high-resolution characteristics in the evaluation of spatial derivatives. Compact finite difference schemes are optimized to obtain maximum resolution characteristics in space for various spatial truncation orders. An analytic method with a systematic procedure to achieve maximum resolution characteristics is devised for multidiagonal schemes, based on the idea of the minimization of dispersive (phase) errors in the wave number domain, and these are applied to the analytic optimization of multidiagonal compact schemes. Actual performances of the optimized compact schemes with a variety of truncati...
The numerical simulation of aeroacoustic phenomena requires high-order accurate numerical schemes wi...
We consider propagation problems on the sphere and their approximation by a compact finite differenc...
Abstract: A detailed comparison of one-dimensional compact schemes versus central-differen...
Direct numerical simulations and computational aeroacoustics require an accurate finite difference s...
The numerical simulation of aeroacoustic phenomena requires high-order accurate numerical schemes wi...
A set of optimised boundary closure schemes is presented for use with compact central finite differe...
A set of explicit finite difference schemes with large stencil was optimized to obtain maximum resol...
In this paper, we have combined some spatial derivatives with the optimised time derivative proposed...
A family of space- and time-optimised prefactored compact schemes are developed that minimize the co...
This paper compares the performance of two optimized high-order finite-difference schemes with Runge...
The optimized high-order compact (OHOC) finite difference schemes, proposed as central schemes are u...
A new family of prefactored cost-optimized schemes is developed to minimize the computational cost f...
A variety of aeroacoustic problems involve small-amplitude linear wave propagation. Highorder scheme...
The performances of high-order, highly efficient finite difference schemes with Runge-Kutta time int...
In developing suitable numerical techniques for computational aero-acoustics, the dispersion-relatio...
The numerical simulation of aeroacoustic phenomena requires high-order accurate numerical schemes wi...
We consider propagation problems on the sphere and their approximation by a compact finite differenc...
Abstract: A detailed comparison of one-dimensional compact schemes versus central-differen...
Direct numerical simulations and computational aeroacoustics require an accurate finite difference s...
The numerical simulation of aeroacoustic phenomena requires high-order accurate numerical schemes wi...
A set of optimised boundary closure schemes is presented for use with compact central finite differe...
A set of explicit finite difference schemes with large stencil was optimized to obtain maximum resol...
In this paper, we have combined some spatial derivatives with the optimised time derivative proposed...
A family of space- and time-optimised prefactored compact schemes are developed that minimize the co...
This paper compares the performance of two optimized high-order finite-difference schemes with Runge...
The optimized high-order compact (OHOC) finite difference schemes, proposed as central schemes are u...
A new family of prefactored cost-optimized schemes is developed to minimize the computational cost f...
A variety of aeroacoustic problems involve small-amplitude linear wave propagation. Highorder scheme...
The performances of high-order, highly efficient finite difference schemes with Runge-Kutta time int...
In developing suitable numerical techniques for computational aero-acoustics, the dispersion-relatio...
The numerical simulation of aeroacoustic phenomena requires high-order accurate numerical schemes wi...
We consider propagation problems on the sphere and their approximation by a compact finite differenc...
Abstract: A detailed comparison of one-dimensional compact schemes versus central-differen...