Recovery of Functions by Interpolation and Sampling

## Abstract We prove a new sampling formula and disprove the existence of a Shannon sampling formula for functions in the Hardy space ℋ︁^2^(ℝ). As a consequence, a new series representation of the Riemann zeta function in the half plane \documentclass{article}\footskip=0pc\pagestyle{empty}\begin{do

We construct a meromorphic matrix function with given spectral data in the form of null and pole functions, coupling matrix, and left annihilator at every point in the domain of definition of the function. Based on these results, descriptions are given of minimal divisibility of meromorphic matrix f

Special entire functions of completely regular growth with additional properties are utilized to interpolate entire functions with certain bounds, and to give an example of a weighted inductive limit of Banach spaces of entire functions such that its topology cannot be described by the canonical wei

## Abstract In this paper we investigate the approximation behaviour of the so‐called Hermite–Fejér interpolation operator based on the zeros of Jacobi polynomials. As a result we obtain the asymptotic formula of approximation rate for these operators. Moreover, such a formula is valid for any indi

## Abstract This paper proposes an interpolation method called the “window function method” in which the sampling theorem and the window functions are combined. The cause of the generation of the interpolation error is the folding distortion due to the multiplication of the time‐limited window to t