Add to ORKGAbstract. A collection of algorithms is described for numerically computing with smooth functions defined on the unit sphere. Functions are approximated to essentially machine precision by using a structure-preserving iterative variant of Gaussian elimination together with the double Fourier sphere method. We show that this procedure allows for stable differentiation, reduces the oversampling of functions near the poles, and converges for certain analytic functions. Operations such as function evaluation, differentiation, and integration are particularly efficient and can be computed by essentially one-dimensional algorithms. A highlight is an optimal complexity direct solver for Poisson’s equation on the sphere using a spectral method. Wit...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...
[[abstract]]A simple and efficient class of FFT-based fast direct solvers for Poisson equation on 2D...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...
A collection of algorithms is described for numerically computing with smooth functions defined on t...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A collection of algorithms in object-oriented MATLAB is described for numerically computing with smo...
AbstractSpherical Fourier series play an important role in many applications. A numerically stable f...
. In this paper, we propose an algorithm for the stable and efficient computation of Fourier expansi...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...
[[abstract]]A simple and efficient class of FFT-based fast direct solvers for Poisson equation on 2D...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...
A collection of algorithms is described for numerically computing with smooth functions defined on t...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A new low rank approximation method for computing with functions in polar and spherical geometries i...
A collection of algorithms in object-oriented MATLAB is described for numerically computing with smo...
AbstractSpherical Fourier series play an important role in many applications. A numerically stable f...
. In this paper, we propose an algorithm for the stable and efficient computation of Fourier expansi...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
We propose a method to construct numerical solutions of a parabolic equation on the unit sphere. Th...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...
[[abstract]]A simple and efficient class of FFT-based fast direct solvers for Poisson equation on 2D...
AbstractThis paper considers the problem of efficient computation of the spherical harmonic expansio...