International audienceThis paper is concerned with the approximation of a function $u$ in a given subspace $V_m$ of dimension $m$ from evaluations of the function at $n$ suitably chosen points. The aim is to construct an approximation of $u$ in $V_m$ which yields an error close to the best approximation error in $V_m$ and using as few evaluations as possible. Classical least-squares regression, which defines a projection in $V_m$ from $n$ random points, usually requires a large $n$ to guarantee a stable approximation and an error close to the best approximation error. This is a major drawback for applications where $u$ is expensive to evaluate. One remedy is to use a weighted least-squares projection using $n$ samples drawn from a properly ...
We tackle the problem of large-scale robust fitting using the truncated least squares (TLS) loss. Ex...
We address the problem of fast estimation of ordinary least squares (OLS) from large amounts of data...
Abstract We study designs, optimal up to and including terms that are O(n−1), for weighted least squ...
International audienceThis paper is concerned with the approximation of a function $u$ in a given su...
Data gathering is a constant in human history with ever increasing amounts in quantity and dimension...
17 pages, 7 figuresWe consider the problem of approximating an unknown function $u\in L^2(D,\rho)$fr...
We consider the problem of reconstructing an unknown function f on a domain X from samples of f at n...
Weighted least squares polynomial approximation uses random samples to determine projections of func...
We study nonlinear least-squares problem that can be transformed to linear problem by change of vari...
In this note, we develop fast and deterministic dimensionality reduction techniques for a family of ...
We study randomized sketching methods for approximately solving least-squares prob-lem with a genera...
We consider best approximation problems in a nonlinear subset ℳ of a Banach space of functions (,∥•∥...
AbstractIt is a common procedure for scattered data approximation to use local polynomial fitting in...
We address the problem of fast estimation of ordinary least squares (OLS) from large amounts of data...
AbstractThis article is concerned with the approximation problem of fitting n data points by a quasi...
We tackle the problem of large-scale robust fitting using the truncated least squares (TLS) loss. Ex...
We address the problem of fast estimation of ordinary least squares (OLS) from large amounts of data...
Abstract We study designs, optimal up to and including terms that are O(n−1), for weighted least squ...
International audienceThis paper is concerned with the approximation of a function $u$ in a given su...
Data gathering is a constant in human history with ever increasing amounts in quantity and dimension...
17 pages, 7 figuresWe consider the problem of approximating an unknown function $u\in L^2(D,\rho)$fr...
We consider the problem of reconstructing an unknown function f on a domain X from samples of f at n...
Weighted least squares polynomial approximation uses random samples to determine projections of func...
We study nonlinear least-squares problem that can be transformed to linear problem by change of vari...
In this note, we develop fast and deterministic dimensionality reduction techniques for a family of ...
We study randomized sketching methods for approximately solving least-squares prob-lem with a genera...
We consider best approximation problems in a nonlinear subset ℳ of a Banach space of functions (,∥•∥...
AbstractIt is a common procedure for scattered data approximation to use local polynomial fitting in...
We address the problem of fast estimation of ordinary least squares (OLS) from large amounts of data...
AbstractThis article is concerned with the approximation problem of fitting n data points by a quasi...
We tackle the problem of large-scale robust fitting using the truncated least squares (TLS) loss. Ex...
We address the problem of fast estimation of ordinary least squares (OLS) from large amounts of data...
Abstract We study designs, optimal up to and including terms that are O(n−1), for weighted least squ...