We discuss and compare two greedy algorithms, that compute discrete versions of Fekete-like points for multivariate compact sets by basic tools of numerical linear algebra. The first gives the so-called ``Approximate Fekete Points'' by QR factorization with column pivoting of Vandermonde-like matrices. The second computes Discrete Leja Points by LU factorization with row pivoting. Moreover, we study the asymptotic distribution of such points when they are extracted from Weakly Admissible Meshes
AbstractWe estimate the growth of the Lebesgue constant of any Leja sequence for the unit disk. The ...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
Weakly Admissible Meshes and their Discrete Extremal Sets (computed by basic numerical linear algebr...
We discuss and compare two greedy algorithms, that compute discrete versions of Fekete-like points f...
AbstractWe propose a numerical method (implemented in Matlab) for computing approximate Fekete point...
We present a brief survey on (Weakly) Admissible Meshes and corresponding Discrete Extremal Sets, na...
AbstractWe have computed point sets with maximal absolute value of the Vandermonde determinant (Feke...
Using the concept of Geometric Weakly Admissible Meshes together with an algorithm based on the clas...
We compute approximate Fekete points for weighted polynomial interpolation, by a recent algorithm ba...
We propose a new spectral element method based on Fekete points. We use the Fekete criterion to comp...
AbstractWe have implemented a Matlab code to compute Discrete Extremal Sets (of Fekete and Leja type...
AbstractSuppose that K⊂Rd is compact and that we are given a function f∈C(K) together with distinct ...
We discuss some theoretical aspects of the univariate case of the method recently introduced by Somm...
An algorithm is presented to compute good point sets and weights for discrete least squares polynomi...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
AbstractWe estimate the growth of the Lebesgue constant of any Leja sequence for the unit disk. The ...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
Weakly Admissible Meshes and their Discrete Extremal Sets (computed by basic numerical linear algebr...
We discuss and compare two greedy algorithms, that compute discrete versions of Fekete-like points f...
AbstractWe propose a numerical method (implemented in Matlab) for computing approximate Fekete point...
We present a brief survey on (Weakly) Admissible Meshes and corresponding Discrete Extremal Sets, na...
AbstractWe have computed point sets with maximal absolute value of the Vandermonde determinant (Feke...
Using the concept of Geometric Weakly Admissible Meshes together with an algorithm based on the clas...
We compute approximate Fekete points for weighted polynomial interpolation, by a recent algorithm ba...
We propose a new spectral element method based on Fekete points. We use the Fekete criterion to comp...
AbstractWe have implemented a Matlab code to compute Discrete Extremal Sets (of Fekete and Leja type...
AbstractSuppose that K⊂Rd is compact and that we are given a function f∈C(K) together with distinct ...
We discuss some theoretical aspects of the univariate case of the method recently introduced by Somm...
An algorithm is presented to compute good point sets and weights for discrete least squares polynomi...
Firstly, we present new sets of nodes for polynomial interpolation on the square that are asymptotic...
AbstractWe estimate the growth of the Lebesgue constant of any Leja sequence for the unit disk. The ...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
Weakly Admissible Meshes and their Discrete Extremal Sets (computed by basic numerical linear algebr...