Optimized compact filtering schemes for computational aeroacoustics

## Abstract We develop a class of fifth‐order methods to solve linear acoustics and/or aeroacoustics. Based on local Hermite polynomials, we investigate three competing strategies for solving hyperbolic linear problems with a fifth‐order accuracy. A one‐dimensional (1D) analysis in the Fourier seri

Implicit, high-order schemes are developed for time-accurate numerical solutions of hyperbolic equation systems. High-order spatial accuracy for the implicit operators is obtained at no additional computing cost by performing compact differentiation. The resulting alternating direction implicit and

Compact computational schemes for the first biharmonic problem in a rectangle \(a \times b\) with fourth- and second-order truncation errors and expressed in matrix form are presented. The matrix formulation of the fourth-order schemes is based on a kind of \((p, q, r, s)\) noncoupled approach which

For strongly directed anisotropic processes such as coherence-enhancing diffusion filtering it is crucial to use numerical schemes with highly accurate directional behavior. We show that this is not possible in a satisfactory way when discretizations are limited to 3 × 3 stencils. As a consequence,