The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-continuous, and the associated quadrature formula, the trapezoidal rule, converges if f is continuous. What if the points are perturbed? With equispaced grid spacing h, let each point be perturbed by an arbitrary amount ≤ α h, where α ∈ [0,1/2) is a fixed constant. The Kadec 1/4 theorem of sampling theory suggests there may be be trouble for α ≥ 1/4. We show that convergence of both the interpolants and the quadrature estimates is guaranteed for all α < 1/2 if f is twice continuously differentiable, with the convergence rate depending on the smoothness of f. More precisely it is enough for f to have 4α derivatives in a certain sense, and we...
It is well known that the rate of convergence of the solution u(epsilon) of a singular perturbed pro...
AbstractGiven a set of points xi, i=0,…,n on [−1,1] and the corresponding values yi, i=0,…,n of a 2-...
AbstractThis note generalizes estimates in [8] for approximation of periodic functions by Fourier su...
The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-c...
This thesis discusses several topics related to interpolation and how it is used in numerical analys...
This article proposes a generalization of the Fourier interpolation formula, where a wider range of ...
l Grunwald [1] and Marcinkiewicz [2] have shown by examples the existence of continuous functions fo...
AbstractFor r>0 let AP(Dr) denote the set of 2π-periodic functions which are analytic on the closed ...
AbstractConvergence properties of quadratic spline interpolation of continuous functions that does n...
A well-known result in linear approximation theory states that the norm of the operator, known as th...
AbstractLet f:R↦C be a continuous, 2π-periodic function and for each n ϵN let tn(f; ·) denote the tr...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
We study the convergence of rational interpolants with prescribed poles on the unit circle to the He...
We introduce a procedure for convergence acceleration of the quasi-periodic trigonometric interpolat...
AbstractIn this paper, both trigonometric and paratrigonometric Hermite interpolation for any number...
It is well known that the rate of convergence of the solution u(epsilon) of a singular perturbed pro...
AbstractGiven a set of points xi, i=0,…,n on [−1,1] and the corresponding values yi, i=0,…,n of a 2-...
AbstractThis note generalizes estimates in [8] for approximation of periodic functions by Fourier su...
The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-c...
This thesis discusses several topics related to interpolation and how it is used in numerical analys...
This article proposes a generalization of the Fourier interpolation formula, where a wider range of ...
l Grunwald [1] and Marcinkiewicz [2] have shown by examples the existence of continuous functions fo...
AbstractFor r>0 let AP(Dr) denote the set of 2π-periodic functions which are analytic on the closed ...
AbstractConvergence properties of quadratic spline interpolation of continuous functions that does n...
A well-known result in linear approximation theory states that the norm of the operator, known as th...
AbstractLet f:R↦C be a continuous, 2π-periodic function and for each n ϵN let tn(f; ·) denote the tr...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
We study the convergence of rational interpolants with prescribed poles on the unit circle to the He...
We introduce a procedure for convergence acceleration of the quasi-periodic trigonometric interpolat...
AbstractIn this paper, both trigonometric and paratrigonometric Hermite interpolation for any number...
It is well known that the rate of convergence of the solution u(epsilon) of a singular perturbed pro...
AbstractGiven a set of points xi, i=0,…,n on [−1,1] and the corresponding values yi, i=0,…,n of a 2-...
AbstractThis note generalizes estimates in [8] for approximation of periodic functions by Fourier su...