For sampling values along spherical Lissajous curves we establish a spectral interpolation and quadrature scheme on the sphere. We provide a mathematical analysis of spherical Lissajous curves and study the characteristic properties of their intersection points. Based on a discrete orthogonality structure we are able to prove the unisolvence of the interpolation problem. As basis functions for the interpolation space we use a parity-modified double Fourier basis on the sphere that allows us to implement the interpolation scheme in an efficient way. We further show that the numerical condition number of the interpolation scheme displays a logarithmic growth. As an application, we use the developed interpolation algorithm to estimate the rota...
AbstractWe consider interpolation by spherical harmonics at points on a (d−1)-dimensional sphere and...
. We discuss several approaches to the problem of interpolating or approximating data given at scatt...
We consider interpolation by spherical harmonics at points on a (d-1)-dimensional sphere and show th...
For sampling values along spherical Lissajous curves we establish a spectral interpolation and quadr...
Rhodonea curves are classical planar curves in the unit disk with the characteristic shape of a rose...
Motivated by an application in Magnetic Particle Imaging, we study bivariate Lagrange interpolation ...
We study a subspace of bivariate trigonometric polynomials for interpolating functions on the sphere...
AbstractThe purpose of the paper is to adapt to the spherical case the basic theory and the computat...
The problem of interpolation on the unit sphere S by spherical polynomials of degree at most n i...
AbstractAn efficient and flexible algorithm for the spherical interpolation of large scattered data ...
The problem of interpolation at (n + 1) points on the unit sphere S by spherical polynomials o...
Abstract In polynomial interpolation, the choice of the polynomial basis and the location of the int...
Abstract. We construct nearly optimal quadratures for the sphere that are invariant under the icosah...
We consider the Lagrange interpolation with Spherical Harmonics of data located on the equiangular C...
We study the existence and computation of spherical rational quartic curves that interpolate Hermite...
AbstractWe consider interpolation by spherical harmonics at points on a (d−1)-dimensional sphere and...
. We discuss several approaches to the problem of interpolating or approximating data given at scatt...
We consider interpolation by spherical harmonics at points on a (d-1)-dimensional sphere and show th...
For sampling values along spherical Lissajous curves we establish a spectral interpolation and quadr...
Rhodonea curves are classical planar curves in the unit disk with the characteristic shape of a rose...
Motivated by an application in Magnetic Particle Imaging, we study bivariate Lagrange interpolation ...
We study a subspace of bivariate trigonometric polynomials for interpolating functions on the sphere...
AbstractThe purpose of the paper is to adapt to the spherical case the basic theory and the computat...
The problem of interpolation on the unit sphere S by spherical polynomials of degree at most n i...
AbstractAn efficient and flexible algorithm for the spherical interpolation of large scattered data ...
The problem of interpolation at (n + 1) points on the unit sphere S by spherical polynomials o...
Abstract In polynomial interpolation, the choice of the polynomial basis and the location of the int...
Abstract. We construct nearly optimal quadratures for the sphere that are invariant under the icosah...
We consider the Lagrange interpolation with Spherical Harmonics of data located on the equiangular C...
We study the existence and computation of spherical rational quartic curves that interpolate Hermite...
AbstractWe consider interpolation by spherical harmonics at points on a (d−1)-dimensional sphere and...
. We discuss several approaches to the problem of interpolating or approximating data given at scatt...
We consider interpolation by spherical harmonics at points on a (d-1)-dimensional sphere and show th...