This paper concerns the approximation of smooth, high-dimensional functions from limited samples using polynomials. This task lies at the heart of many applications in computational science and engineering -- notably, those arising from parametric modelling and uncertainty quantification. It is common to use Monte Carlo (MC) sampling in such applications, so as not to succumb to the curse of dimensionality. However, it is well known this strategy is theoretically suboptimal. There are many polynomial spaces of dimension $n$ for which the sample complexity scales log-quadratically in $n$. This well-documented phenomenon has led to a concerted effort to design improved, in fact, near-optimal strategies, whose sample complexities scale log-lin...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
The first part of this thesis concerns the inference of un-normalized statistical models. We study t...
AbstractQuasi-Monte Carlo (QMC) methods have been successfully used to compute high-dimensional inte...
We analyze the accuracy of the discrete least-squares approximation of a function u in multivariate ...
Optimization algorithms and Monte Carlo sampling algorithms have provided the computational foundati...
In this paper we develop a collection of results associated to the analysis of the sequential Monte ...
We investigate the stability of a Sequential Monte Carlo (SMC) method applied to the problem of samp...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
AbstractRecently, quasi-Monte Carlo algorithms have been successfully used for multivariate integrat...
Many problems in computational science and engineering can be described in terms of approximating a ...
We study the problem of learning ridge functions of the form f(x) = g(aT x), x ∈ ℝd, from random sam...
abstract: I focus on algorithms that generate good sampling points for function approximation. In 1D...
International audienceMotivated by the development of non-intrusive methods for high dimensional par...
Prices of path dependent options may be modeled as expectations of functions of an infinite sequence...
Many applications in machine learning require optimizing unknown functions defined over a high-dimen...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
The first part of this thesis concerns the inference of un-normalized statistical models. We study t...
AbstractQuasi-Monte Carlo (QMC) methods have been successfully used to compute high-dimensional inte...
We analyze the accuracy of the discrete least-squares approximation of a function u in multivariate ...
Optimization algorithms and Monte Carlo sampling algorithms have provided the computational foundati...
In this paper we develop a collection of results associated to the analysis of the sequential Monte ...
We investigate the stability of a Sequential Monte Carlo (SMC) method applied to the problem of samp...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
AbstractRecently, quasi-Monte Carlo algorithms have been successfully used for multivariate integrat...
Many problems in computational science and engineering can be described in terms of approximating a ...
We study the problem of learning ridge functions of the form f(x) = g(aT x), x ∈ ℝd, from random sam...
abstract: I focus on algorithms that generate good sampling points for function approximation. In 1D...
International audienceMotivated by the development of non-intrusive methods for high dimensional par...
Prices of path dependent options may be modeled as expectations of functions of an infinite sequence...
Many applications in machine learning require optimizing unknown functions defined over a high-dimen...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
The first part of this thesis concerns the inference of un-normalized statistical models. We study t...
AbstractQuasi-Monte Carlo (QMC) methods have been successfully used to compute high-dimensional inte...