It has recently been suggested to represent functions on the sphere by a " multipole vector decomposition ", rather than by the usual spherical harmonic expansion. I recall the definition and main properties of the multipole vectors, as they were introduced in the literature. I show that they are related to the harmonic projection and to the Maxwell decomposition. This allows to deduce additional properties. I extend to complex polynomials
This is the publisher’s final pdf. The published article is copyrighted by American Institute of Phy...
Vector spherical harmonics are a set of basis functions for vector fields derived from the spherical...
Abstract—We offer symmetry relations of the translation coefficients of the spherical scalar and vec...
It has recently been suggested to represent functions on the sphere by a " multipole vector decompos...
Multipole matrix of the Green function of the Laplace equation defined by double convolution of two ...
The aim of this thesis is to study approximation of multivariate functions on the complex sphere by ...
Any eigenfunction of the Laplacian on a sphere is given in terms of a unique set of directions: thes...
Copi, Huterer, Starkman and Schwarz introduced multipole vectors in a tensor context and used them t...
A new method is developed for expanding the electromagnetic field of radiating charges and currents ...
The decomposition of polynomials in terms of spherical harmonics is widely used in various branches ...
We construct spherical vector bases that are bandlimited and spatially concentrated, or alternativel...
The spherical-multipole expansion of an inhomogeneous electromagnetic plane wave is derived by exten...
AbstractAdvances in approximation theory are often driven by applications. This paper explores two r...
This book treats spherical harmonic expansion of real analytic functions and hyperfunctions on the s...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
This is the publisher’s final pdf. The published article is copyrighted by American Institute of Phy...
Vector spherical harmonics are a set of basis functions for vector fields derived from the spherical...
Abstract—We offer symmetry relations of the translation coefficients of the spherical scalar and vec...
It has recently been suggested to represent functions on the sphere by a " multipole vector decompos...
Multipole matrix of the Green function of the Laplace equation defined by double convolution of two ...
The aim of this thesis is to study approximation of multivariate functions on the complex sphere by ...
Any eigenfunction of the Laplacian on a sphere is given in terms of a unique set of directions: thes...
Copi, Huterer, Starkman and Schwarz introduced multipole vectors in a tensor context and used them t...
A new method is developed for expanding the electromagnetic field of radiating charges and currents ...
The decomposition of polynomials in terms of spherical harmonics is widely used in various branches ...
We construct spherical vector bases that are bandlimited and spatially concentrated, or alternativel...
The spherical-multipole expansion of an inhomogeneous electromagnetic plane wave is derived by exten...
AbstractAdvances in approximation theory are often driven by applications. This paper explores two r...
This book treats spherical harmonic expansion of real analytic functions and hyperfunctions on the s...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
This is the publisher’s final pdf. The published article is copyrighted by American Institute of Phy...
Vector spherical harmonics are a set of basis functions for vector fields derived from the spherical...
Abstract—We offer symmetry relations of the translation coefficients of the spherical scalar and vec...