Add to ORKGIn an important paper published in 1966 by the first author [10] a very general interpolation formula for univariate functions, which includes, as special cases, the classical interpolation formulae of Lagrange, Newton, Taylor and Hermite was introduced and investigated. The purpose of the present paper is to extend that formula to the two-dimensional case. The remainders are expressed by means of partial divided differences and derivatives
AbstractIn this article we investigate the minimal dimension of a subspace of C1(R2) needed to inter...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
AbstractPrevious work on interpolation by linear combinations of the form aC(x) + bS(x) + ∑i=0n−2αix...
AbstractIn this paper, Hermite interpolation by bivariate algebraic polynomials of total degree ⩽nis...
AbstractWe give a natural definition of multivariate divided differences and we construct the multiv...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractSome asymptotic conditions along prescribed directions are added to the usual interpolation ...
AbstractA simple proof of a recent result of G. Berger and M. Tasche concerning the coefficients of ...
We discuss a polynomial interpolation problem where the data are of the form of a set of algebraic c...
In this paper is to present generalization of the Lagrange interpolation polynomials in higher dimen...
In this paper is to present generalization of the Lagrange interpolation polynomials in higher dimen...
Abstract. This paper contains a detailed comparison between the Lagrange and Hermite polynomial inte...
Abstract. This paper contains a detailed comparison between the Lagrange and Hermite polynomial inte...
We give an identity for the Hermite-Lagrange interpolating polynomial and a short proof of Leibniz-t...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractIn this article we investigate the minimal dimension of a subspace of C1(R2) needed to inter...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
AbstractPrevious work on interpolation by linear combinations of the form aC(x) + bS(x) + ∑i=0n−2αix...
AbstractIn this paper, Hermite interpolation by bivariate algebraic polynomials of total degree ⩽nis...
AbstractWe give a natural definition of multivariate divided differences and we construct the multiv...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractSome asymptotic conditions along prescribed directions are added to the usual interpolation ...
AbstractA simple proof of a recent result of G. Berger and M. Tasche concerning the coefficients of ...
We discuss a polynomial interpolation problem where the data are of the form of a set of algebraic c...
In this paper is to present generalization of the Lagrange interpolation polynomials in higher dimen...
In this paper is to present generalization of the Lagrange interpolation polynomials in higher dimen...
Abstract. This paper contains a detailed comparison between the Lagrange and Hermite polynomial inte...
Abstract. This paper contains a detailed comparison between the Lagrange and Hermite polynomial inte...
We give an identity for the Hermite-Lagrange interpolating polynomial and a short proof of Leibniz-t...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractIn this article we investigate the minimal dimension of a subspace of C1(R2) needed to inter...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
AbstractPrevious work on interpolation by linear combinations of the form aC(x) + bS(x) + ∑i=0n−2αix...