AbstractWe describe how points may be placed on collections of algebraic varieties so that the resulting system is unisolvent for polynomial interpolation. We also give formulas for the corresponding Vandermonde determinants
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Fekete points are the points that maximize a Vandermonde-type determinant that appears in the polyno...
AbstractWe describe how points may be placed on collections of algebraic varieties so that the resul...
We give configurations of points which are proven to be univsolvent for polynomial interpolation
A new and straightforward proof of the unisolvability of the problem of multivariate polynomial inte...
A new and straightforward proof of the unisolvability of the problem of multivariate polynomial inte...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
In this paper we establish the unisolvence of any interlacing pair of rectangular grids of points wi...
AbstractPolynomial interpolation of two variables based on points that are located on multiple circl...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
This thesis studies two aspects of polynomial interpolation theory. The first part sets forth explic...
In contrast to the univariate case, interpolation with polynomials of a given maximal total degree i...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Fekete points are the points that maximize a Vandermonde-type determinant that appears in the polyno...
AbstractWe describe how points may be placed on collections of algebraic varieties so that the resul...
We give configurations of points which are proven to be univsolvent for polynomial interpolation
A new and straightforward proof of the unisolvability of the problem of multivariate polynomial inte...
A new and straightforward proof of the unisolvability of the problem of multivariate polynomial inte...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
In this paper we establish the unisolvence of any interlacing pair of rectangular grids of points wi...
AbstractPolynomial interpolation of two variables based on points that are located on multiple circl...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
This thesis studies two aspects of polynomial interpolation theory. The first part sets forth explic...
In contrast to the univariate case, interpolation with polynomials of a given maximal total degree i...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Fekete points are the points that maximize a Vandermonde-type determinant that appears in the polyno...
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