Add to ORKGWe present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation applied to functions transplanted to either a semi-infinite or an infinite interval under exponential or double-exponential transformations. This strategy is useful for approximating and computing with functions that are analytic apart from endpoint singularities. The use of Chebyshev polynomials instead of the more commonly used cardinal sinc or Fourier interpolants is important because it enables one to apply maps to semi-infinite intervals for functions which have only a single endpoint singularity. In such cases, this leads to significantly improved convergence rates
AbstractThe authors study convergence of certain exponential sums that interpolate to functions whic...
summary:The polynomial approximation to a function in a semi-infinite interval has been worked out b...
AbstractOver the rectangle Ω = (−1. 1) × (−π, π) of R2, interpolation involving algebraic polynomial...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
Abstract. The focus of this article is the approximation of functions which are analytic on a compac...
We are concerned in this thesis with the problem of how to extend standard methods of approximating ...
We discuss polynomial interpolation and derive sufficient conditions for the uniform convergence of ...
We discuss polynomial interpolation and derive sufficient conditions for the uniform convergence of ...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients a, con...
AbstractSome new properties of the Lebesgue function associated with interpolation at the Chebyshev ...
In [2, 3, 5] we discuss a rational interpolation procedure that generalises near-best poly-nomial in...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients an con...
Most areas of numerical analysis, as well as many other areas of Mathemat-ics as a whole, make use o...
In a review of methods that use “Whittaker cardinal ” or “sine ” functions, Stenger [l] shows that t...
AbstractThe authors study convergence of certain exponential sums that interpolate to functions whic...
summary:The polynomial approximation to a function in a semi-infinite interval has been worked out b...
AbstractOver the rectangle Ω = (−1. 1) × (−π, π) of R2, interpolation involving algebraic polynomial...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
Abstract. The focus of this article is the approximation of functions which are analytic on a compac...
We are concerned in this thesis with the problem of how to extend standard methods of approximating ...
We discuss polynomial interpolation and derive sufficient conditions for the uniform convergence of ...
We discuss polynomial interpolation and derive sufficient conditions for the uniform convergence of ...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients a, con...
AbstractSome new properties of the Lebesgue function associated with interpolation at the Chebyshev ...
In [2, 3, 5] we discuss a rational interpolation procedure that generalises near-best poly-nomial in...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients an con...
Most areas of numerical analysis, as well as many other areas of Mathemat-ics as a whole, make use o...
In a review of methods that use “Whittaker cardinal ” or “sine ” functions, Stenger [l] shows that t...
AbstractThe authors study convergence of certain exponential sums that interpolate to functions whic...
summary:The polynomial approximation to a function in a semi-infinite interval has been worked out b...
AbstractOver the rectangle Ω = (−1. 1) × (−π, π) of R2, interpolation involving algebraic polynomial...