Add to ORKGWe define F-polynomials as linear combinations of dilations by some frequencies of an entire function F. In this paper we use Pade interpolation of holomorphic functions in the unit disk by F-polynomials to obtain explicitly approximating F-polynomials with sharp estimates on their coefficients. We show that when frequencies lie in a compact set K C C then optimal choices for the frequencies of interpolating polynomials are similar to Fekete points. Moreover, the minimal norms of the interpolating operators form a sequence whose rate of growth is determined by the transfinite diameter of K. In case of the Laplace transforms of measures on K, we show that the coefficients of interpolating polynomials stay bounded provided that the frequencie...
AbstractWe investigate the following problem: For which open simply connected domains do there exist...
This paper investigates the norms of certain interpolation operators of analytic functions on the un...
We discuss problems on Hankel determinants and the classical moment related to and inspired by certa...
AbstractThis paper studies a generalization of polynomial interpolation: given a continuous function...
Firstly, we present new sets of nodes for {\em polynomial interpolation on the square} that are asym...
A polynomial of degree n in z~l and n- 1 in z is defined by an interpolation projection I', fro...
AbstractFor any finitely connected open domain D bounded by Jordan curves, it is proved that there e...
Dedicated to the well-respected research mathematician Ambikeshwar Sharma, Frontiers in Interpolatio...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
AbstractFor Banach space operators T satisfying the Tadmor–Ritt condition ||(zI−T)−1||⩽C|z−1|−1, |z|...
From the Erdös-Turán theorem, it is known that if f is a continuous function on T={z:|z|=1} and L_n(...
Abstract. Let E ‰ Rs be compact and let d En denote the dimension of the space of polynomials of deg...
AbstractThe objective of this paper is to derive an intimate relationship among three important math...
The paper deals with the order of convergence of the Laurent polynomials of Hermite-Fejér interpolat...
AbstractWe investigate the following problem: For which open simply connected domains do there exist...
This paper investigates the norms of certain interpolation operators of analytic functions on the un...
We discuss problems on Hankel determinants and the classical moment related to and inspired by certa...
AbstractThis paper studies a generalization of polynomial interpolation: given a continuous function...
Firstly, we present new sets of nodes for {\em polynomial interpolation on the square} that are asym...
A polynomial of degree n in z~l and n- 1 in z is defined by an interpolation projection I', fro...
AbstractFor any finitely connected open domain D bounded by Jordan curves, it is proved that there e...
Dedicated to the well-respected research mathematician Ambikeshwar Sharma, Frontiers in Interpolatio...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
AbstractFor Banach space operators T satisfying the Tadmor–Ritt condition ||(zI−T)−1||⩽C|z−1|−1, |z|...
From the Erdös-Turán theorem, it is known that if f is a continuous function on T={z:|z|=1} and L_n(...
Abstract. Let E ‰ Rs be compact and let d En denote the dimension of the space of polynomials of deg...
AbstractThe objective of this paper is to derive an intimate relationship among three important math...
The paper deals with the order of convergence of the Laurent polynomials of Hermite-Fejér interpolat...
AbstractWe investigate the following problem: For which open simply connected domains do there exist...
This paper investigates the norms of certain interpolation operators of analytic functions on the un...
We discuss problems on Hankel determinants and the classical moment related to and inspired by certa...