Approximation of multivariate functions and evaluation of particular solutions using Chebyshev polynomial and trigonometric basis functions

## Abstract The error of approximation by families of linear trigonometric polynomial operators in the scale of __L~p~__‐spaces of periodic functions with 0 < __p__ ⩽ +∞ is characterized with the help of realization functionals associated with operators of multiplier type describing smoothness prop

## Abstract In this article, we introduce a type of basis functions to approximate a set of scattered data. Each of the basis functions is in the form of a truncated series over some orthogonal system of eigenfunctions. In particular, the trigonometric eigenfunctions are used. We test our basis fun

## Abstract In this study, traveling wave solutions of the modified regularized long wave (MRLW) equation are simulated by using the meshless method based on collocation with well‐known radial basis functions. The method is tested for three test problems which are single solitary wave motion, inter

## Abstract The boundary conditions performance (BCP) is shown to be an appropriate error criterion to estimate accuracy of method of moments (MoM) solutions on arbitrary structures, including open surfaces. A proper BCP error metric for electric field integral equations (EFIE) formulation is defin