In this paper a general theory for interpolation methods on a rectangular grid is introduced. By the use of this theory an efficient B-spline-based interpolation method for spectral codes is presented. The theory links the order of the interpolation method with its spectral properties. In this way many properties like order of continuity, order of convergence, and magnitude of errors can be explained. Furthermore, a fast implementation of the interpolation methods is given. We show that the B-spline-based interpolation method has several advantages compared to other methods. First, the order of continuity of the interpolated field is higher than for other methods. Second, only one FFT is needed, whereas, for example, Hermite interpolation n...
This paper describes a fast algorithm to interpolate between samples of a bandwidth-limited signal t...
International audienceLinear interpolation methods have the characteristics of low computational com...
The error in Chebyshev or Fourier interpolation is the product of a rapidly varying factor with a sl...
In this paper a general theory for interpolation methods on a rectangular grid is introduced. By the...
A Chebyshev or Fourier series may be evaluated on the standard collocation grid by the fast Fourier ...
We propose a robust interpolation algorithm for model-based spectral analysis. Instead of estimating...
An important aspect in numerical simulations of particle laden turbulent flows is the interpolation ...
An important aspect in numerical simulations of particle-laden turbulent flows is the interpolation ...
An important aspect in numerical simulations of particle-laden turbulent flows is the interpolation ...
This monograph presents fundamental aspects of modern spectral and other computational methods, whic...
International audienceWe explain how the B-spline interpolation of signals and, in particular, of im...
In the conventional pseudo-spectral collocation method to solve an ordinary first order differential...
This paper is solely devoted to spectral iterative methods including spectral multigrid methods. The...
This paper describes a fast algorithm to interpolate between samples of a bandwidth-limited signal t...
International audienceLinear interpolation methods have the characteristics of low computational com...
The error in Chebyshev or Fourier interpolation is the product of a rapidly varying factor with a sl...
In this paper a general theory for interpolation methods on a rectangular grid is introduced. By the...
A Chebyshev or Fourier series may be evaluated on the standard collocation grid by the fast Fourier ...
We propose a robust interpolation algorithm for model-based spectral analysis. Instead of estimating...
An important aspect in numerical simulations of particle laden turbulent flows is the interpolation ...
An important aspect in numerical simulations of particle-laden turbulent flows is the interpolation ...
An important aspect in numerical simulations of particle-laden turbulent flows is the interpolation ...
This monograph presents fundamental aspects of modern spectral and other computational methods, whic...
International audienceWe explain how the B-spline interpolation of signals and, in particular, of im...
In the conventional pseudo-spectral collocation method to solve an ordinary first order differential...
This paper is solely devoted to spectral iterative methods including spectral multigrid methods. The...
This paper describes a fast algorithm to interpolate between samples of a bandwidth-limited signal t...
International audienceLinear interpolation methods have the characteristics of low computational com...
The error in Chebyshev or Fourier interpolation is the product of a rapidly varying factor with a sl...