Add to ORKGLagrangian interpolation is a classical way to approximate general functions by finite sums of well chosen, pre-definite, linearly independent generating functions; it is much simpler to implement than determining the best fits with respect to some Banach (or even Hilbert) norms. In addition, only partial knowledge is required (here values on some set of points). The problem of defining the best sample of points is nevertheless rather complex and is in general not solved. In this paper we propose a way to derive such sets of points. We do not claim that the points resulting from the construction explained here are optimal in any sense. Nevertheless, the resulting interpolation method is proven to work under certain hypothesis, the process i...
The goal of this paper is to construct %discuss the concept of data--independent optimal point sets ...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...
Abstract. Lagrangian interpolation is a classical way to approximate general functions by finite sum...
Abstract. Lagrangian interpolation is a classical way to approximate general functions by finite sum...
Lagrangian interpolation is a classical way to approximate general functions by finite sums of well c...
Abstract—In an effort to extend the classical Lagrangian interpolation tools, new interpolating meth...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
the paper deals with iterative interpolation methods in forms of similar recursive procedures define...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
<p>The interpolation polynomial of Lagrange is used for the functions of one variable. In this artic...
We give a simple, geometric and explicit construction of bivariate interpolation at certain points i...
We give a simple, geometric and explicit construction of bivariate interpolation at certain points i...
The so-called "Padua points" give a simple, geometric and explicit construction of bivariate polynom...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
The goal of this paper is to construct %discuss the concept of data--independent optimal point sets ...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...
Abstract. Lagrangian interpolation is a classical way to approximate general functions by finite sum...
Abstract. Lagrangian interpolation is a classical way to approximate general functions by finite sum...
Lagrangian interpolation is a classical way to approximate general functions by finite sums of well c...
Abstract—In an effort to extend the classical Lagrangian interpolation tools, new interpolating meth...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
the paper deals with iterative interpolation methods in forms of similar recursive procedures define...
This paper is concerned with Lagrange interpolation by total degree polynomials in moderate dimensio...
<p>The interpolation polynomial of Lagrange is used for the functions of one variable. In this artic...
We give a simple, geometric and explicit construction of bivariate interpolation at certain points i...
We give a simple, geometric and explicit construction of bivariate interpolation at certain points i...
The so-called "Padua points" give a simple, geometric and explicit construction of bivariate polynom...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
The goal of this paper is to construct %discuss the concept of data--independent optimal point sets ...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...
The goal of this paper is to construct data-independent optimal point sets for interpolation by radi...