Singular scattering equations in momentum space

Electrodynamics of Quadrupolar Media. Hermann A. Haus. Department of Electrical Engineering and Research Laboratory of Electronics, Massachusetts Institute of Technology, Cambridge, Massachusetts. The electromagnetic field equations are derived for a moving quadrupolar medium starting with a simple

The classical polynomial collocation method is considered for a class of Cauchy singular integral equations with variable coefficients on a bounded interval. This method is naturally extended to the case of a non-zero index of the underlying Fredholm operator. This is done by using the structure of

The properties of Sturmian basis sets in d-dimensional direct space and d-dimensional momentum space are reviewed, as well as the relationship between hydrogenlike Sturmians and hyperspherical harmonics. The kernel of the reciprocal-space Schrodinger equation is expanded in terms of Strumian basis s

## Abstract A new numerical method is proposed for the analysis of metallic scatterers which can take care of the singular integrals arising in the Method of Moments (MoM) solution for determining the current distribution on the metallic scatterers. The method involves Monte Carlo Integration (MCI)

Jacobi approximations in certain Hilbert spaces are investigated. Several weighted inverse inequalities and Poincare inequalities are obtained. Some approximation ŕesults are given. Singular differential equations are approximated by using Jacobi polynomials. This method keeps the spectral accuracy.