We study the accuracy of the discrete least-squares approximation on a finite dimensional space of a real-valued target function from noisy pointwise evaluations at independent random points distributed according to a given sampling probability measure. The convergence estimates are given in mean-square sense with respect to the sampling measure. The noise may be correlated with the location of the evaluation and may have nonzero mean (offset). We consider both cases of bounded or square-integrable noise / offset. We prove conditions between the number of sampling points and the dimension of the underlying approximation space that ensure a stable and accurate approximation. Particular focus is on deriving estimates in probability within a g...
AbstractWe study uniform approximation of differentiable or analytic functions of one or several var...
We prove the L1-norm and bounded variation norm convergence of a piecewise linear least squares meth...
Motivated by the numerical treatment of parametric and stochastic PDEs, we analyze the least-squares...
We study the accuracy of the discrete least-squares approximation on a finite-dimensional space of a...
We analyse the problem of approximating a multivariate function by discrete least-squares projection...
probability and in expectation for discrete least squares with noisy evaluations at random point
We analyze the problem of approximating a multivariate function by dis-crete least-squares projectio...
We analyse the problem of approximating a multivariate function by dis- crete least-squares project...
We consider the problem of reconstructing an unknown function f on a domain X from samples of f at n...
We analyse the problem of approximating a multivariate function by discrete least-squares projection...
We analyze the stability and accuracy of discrete least squares on multivariate poly- nomial spaces ...
In this paper we study the problem of estimating a function from n noiseless observations of functio...
We consider best approximation problems in a nonlinear subset of a Banach space of functions. The no...
Data gathering is a constant in human history with ever increasing amounts in quantity and dimension...
We analyze the accuracy of the discrete least-squares approximation of a function u in multivariate ...
AbstractWe study uniform approximation of differentiable or analytic functions of one or several var...
We prove the L1-norm and bounded variation norm convergence of a piecewise linear least squares meth...
Motivated by the numerical treatment of parametric and stochastic PDEs, we analyze the least-squares...
We study the accuracy of the discrete least-squares approximation on a finite-dimensional space of a...
We analyse the problem of approximating a multivariate function by discrete least-squares projection...
probability and in expectation for discrete least squares with noisy evaluations at random point
We analyze the problem of approximating a multivariate function by dis-crete least-squares projectio...
We analyse the problem of approximating a multivariate function by dis- crete least-squares project...
We consider the problem of reconstructing an unknown function f on a domain X from samples of f at n...
We analyse the problem of approximating a multivariate function by discrete least-squares projection...
We analyze the stability and accuracy of discrete least squares on multivariate poly- nomial spaces ...
In this paper we study the problem of estimating a function from n noiseless observations of functio...
We consider best approximation problems in a nonlinear subset of a Banach space of functions. The no...
Data gathering is a constant in human history with ever increasing amounts in quantity and dimension...
We analyze the accuracy of the discrete least-squares approximation of a function u in multivariate ...
AbstractWe study uniform approximation of differentiable or analytic functions of one or several var...
We prove the L1-norm and bounded variation norm convergence of a piecewise linear least squares meth...
Motivated by the numerical treatment of parametric and stochastic PDEs, we analyze the least-squares...