abstract: I focus on algorithms that generate good sampling points for function approximation. In 1D, it is well known that polynomial interpolation using equispaced points is unstable. On the other hand, using Chebyshev nodes provides both stable and highly accurate points for polynomial interpolation. In higher dimensional complex regions, optimal sampling points are not known explicitly. This work presents robust algorithms that find good sampling points in complex regions for polynomial interpolation, least-squares, and radial basis function (RBF) methods. The quality of these nodes is measured using the Lebesgue constant. I will also consider optimal sampling for constrained optimization, used to solve PDEs, where boundary conditions m...
A. Interpolation and Approximation The problem with which we are concerned is that of finding some f...
In this work we extend some ideas about greedy algorithms, which are well-established tools for, e.g...
This thesis is concerned, on the one hand, with the design of reduced order models that optimally ap...
This paper concerns the approximation of smooth, high-dimensional functions from limited samples usi...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
Finding suitable points for multivariate polynomial interpolation and approximation is a challenging...
Abstract. We propose two new algorithms to improve greedy sampling of high-dimensional func-tions. W...
International audienceMotivated by the development of non-intrusive methods for high dimensional par...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
The purpose of this thesis is the design of algorithms that can be used to determine optimal solutio...
AbstractSeven types of Chebyshev-like grids in one dimension are compared according to four differen...
We consider the problem of optimizing the choice of interpolation nodes such that the interpolation ...
This thesis concerns the development and analysis of derivative-free optimization algorithms for sim...
Polyharmonic spline (PHS) radial basis functions (RBFs) have been used in conjunction with polynomia...
A. Interpolation and Approximation The problem with which we are concerned is that of finding some f...
In this work we extend some ideas about greedy algorithms, which are well-established tools for, e.g...
This thesis is concerned, on the one hand, with the design of reduced order models that optimally ap...
This paper concerns the approximation of smooth, high-dimensional functions from limited samples usi...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
Finding suitable points for multivariate polynomial interpolation and approximation is a challenging...
Abstract. We propose two new algorithms to improve greedy sampling of high-dimensional func-tions. W...
International audienceMotivated by the development of non-intrusive methods for high dimensional par...
Efficient and effective algorithms are designed to compute the coordinates of nearly optimal points ...
The purpose of this thesis is the design of algorithms that can be used to determine optimal solutio...
AbstractSeven types of Chebyshev-like grids in one dimension are compared according to four differen...
We consider the problem of optimizing the choice of interpolation nodes such that the interpolation ...
This thesis concerns the development and analysis of derivative-free optimization algorithms for sim...
Polyharmonic spline (PHS) radial basis functions (RBFs) have been used in conjunction with polynomia...
A. Interpolation and Approximation The problem with which we are concerned is that of finding some f...
In this work we extend some ideas about greedy algorithms, which are well-established tools for, e.g...
This thesis is concerned, on the one hand, with the design of reduced order models that optimally ap...