Add to ORKGIn this paper, two methods are described for obtaining estimates of the error of rational functions the Pade's and Meahly's methods of approximation were used and it was discovered that Maehly's proved more accurate than the Pade's method. @JASE
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
In this paper, two methods are described for obtaining estimates of the error of rational functions ...
In this paper, two methods are described for obtaining estimates of the error of rational functions ...
This study examines the various considerations which are made when a function is approximated by a r...
The study of the numerical error that can occur in solving systems is an important topic. In various...
AbstractWe show that an error analysis of Y.L. Luke for a rational Tau Method approximation of the s...
Program year: 1981/1982Digitized from print original stored in HDRA rational function is defined as ...
Exact and approximate formulas for computing the Chebyshev expansion coefficients of a rational func...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
We develop the convergence theory for a well-known method for the interpolation of functions on the ...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
In this paper, two methods are described for obtaining estimates of the error of rational functions ...
In this paper, two methods are described for obtaining estimates of the error of rational functions ...
This study examines the various considerations which are made when a function is approximated by a r...
The study of the numerical error that can occur in solving systems is an important topic. In various...
AbstractWe show that an error analysis of Y.L. Luke for a rational Tau Method approximation of the s...
Program year: 1981/1982Digitized from print original stored in HDRA rational function is defined as ...
Exact and approximate formulas for computing the Chebyshev expansion coefficients of a rational func...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
Having good estimates or even bounds for the error in computing approximations to expressions of th...
We develop the convergence theory for a well-known method for the interpolation of functions on the ...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...