Add to ORKGThe paper considers convergence acceleration of the quasi-periodic and the quasi-periodic-rational interpolations by application of polynomial corrections. We investigate convergence of the resultant quasi-periodic-polynomial and quasi-periodic-rational-polynomial interpolations and derive exact constants of the main terms of asymptotic errors in the regions away from the endpoints. Results of numerical experiments clarify behavior of the corresponding interpolations for moderate number of interpolation points
Abstract. Polynomial interpolation to analytic functions can be very accurate, depending on the dist...
AbstractClassical rational interpolation is known to suffer from several drawbacks, such as unattain...
AbstractApproximating a function from its values f(xi) at a set of evenly spaced points xi through (...
The paper considers convergence acceleration of the quasi-periodic and the quasi-periodic-rational i...
The paper considers convergence acceleration of the quasi-periodic and the quasi-periodic-rational i...
We introduce a procedure for convergence acceleration of the quasi-periodic trigonometric interpolat...
We investigate convergence of the rational-trigonometric-polynomial interpolations which perform con...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
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...
Abstract. Polynomial interpolation to analytic functions can be very accurate, depending on the dist...
AbstractClassical rational interpolation is known to suffer from several drawbacks, such as unattain...
AbstractApproximating a function from its values f(xi) at a set of evenly spaced points xi through (...
The paper considers convergence acceleration of the quasi-periodic and the quasi-periodic-rational i...
The paper considers convergence acceleration of the quasi-periodic and the quasi-periodic-rational i...
We introduce a procedure for convergence acceleration of the quasi-periodic trigonometric interpolat...
We investigate convergence of the rational-trigonometric-polynomial interpolations which perform con...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We investigate the convergence of the quasi-periodic interpolation on the entire interval $[-1,1]$ i...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
We consider trigonometric interpolations with shifted equidistant nodes and investigate their accura...
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...
Abstract. Polynomial interpolation to analytic functions can be very accurate, depending on the dist...
AbstractClassical rational interpolation is known to suffer from several drawbacks, such as unattain...
AbstractApproximating a function from its values f(xi) at a set of evenly spaced points xi through (...