Robust regression in statistics leads to challenging optimization problems. Here, we study one such problem, in which the objective is non-smooth, non-convex and expensive to calculate. We study the numerical performance of several derivative-free optimization algorithms with the aim of computing robust multivariate estimators. Our experiences demonstrate that the existing algorithms often fail to deliver optimal solutions. We introduce three new methods that use Powell\u27s derivative-free algorithm. The proposed methods are reliable and can be used when processing very large data sets containing outliers.<br /
Piecewise linear (Formula presented.) -regression problem is formulated as an unconstrained differen...
In this work, we propose a meta algorithm that can solve a multivariate global optimization problem ...
International audienceThe minimization of convex functions which are only available through partial ...
We propose a novel robust optimization technique, which is applicable to nonconvex and simulation-ba...
Optimization problems in engineering often have nonconvex objectives and constraints and require glo...
A novel technique for efficient global robust optimization of problems affected by parametric uncert...
We propose a new robust optimization method for problems with objective functions that may be comput...
Large outliers break down linear and nonlinear regression models. Robust regression methods allow on...
This paper studies robust estimation of multivariate regression model using kernel weighted local li...
We present an approach to nonrigid registration of 3D surfaces. We cast isometric embedding as MRF o...
Consider the problem of estimating the mean function underlying a set of noisy data. Least squares i...
Robust statistics is a branch of statistics dealing with the analysis of data containing contaminate...
International audienceFor dealing with sparse models, a large number of continuous approximations of...
In this article, we consider a large class of computational problems in robust statistics that can b...
Response surface methodology involves relationships between different variables, specifically experi...
Piecewise linear (Formula presented.) -regression problem is formulated as an unconstrained differen...
In this work, we propose a meta algorithm that can solve a multivariate global optimization problem ...
International audienceThe minimization of convex functions which are only available through partial ...
We propose a novel robust optimization technique, which is applicable to nonconvex and simulation-ba...
Optimization problems in engineering often have nonconvex objectives and constraints and require glo...
A novel technique for efficient global robust optimization of problems affected by parametric uncert...
We propose a new robust optimization method for problems with objective functions that may be comput...
Large outliers break down linear and nonlinear regression models. Robust regression methods allow on...
This paper studies robust estimation of multivariate regression model using kernel weighted local li...
We present an approach to nonrigid registration of 3D surfaces. We cast isometric embedding as MRF o...
Consider the problem of estimating the mean function underlying a set of noisy data. Least squares i...
Robust statistics is a branch of statistics dealing with the analysis of data containing contaminate...
International audienceFor dealing with sparse models, a large number of continuous approximations of...
In this article, we consider a large class of computational problems in robust statistics that can b...
Response surface methodology involves relationships between different variables, specifically experi...
Piecewise linear (Formula presented.) -regression problem is formulated as an unconstrained differen...
In this work, we propose a meta algorithm that can solve a multivariate global optimization problem ...
International audienceThe minimization of convex functions which are only available through partial ...