Artículo de publicación ISIThis paper deals with the problem of finding the globally optimal subset of h elements from a larger set of n elements in d space dimensions so as to minimize a quadratic criterion, with an special emphasis on applications to computing the Least Trimmed Squares Estimator (LTSE) for robust regression. The computation of the LTSE is a challenging subset selection problem involving a nonlinear program with continuous and binary variables, linked in a highly nonlinear fashion. The selection of a globally optimal subset using the branch and bound (BB) algorithm is limited to problems in very low dimension, typically d,5 5, as the complexity of the problem increases exponentially with d. We introduce a bold pruning stra...
Many engineering optimization problems can be formulated as nonconvex nonlinear pro-gramming problem...
Two fast group subset selection (GSS) algorithms for the linear regression model are proposed in thi...
We consider low-rank semidefinite programming (LRSDP) relaxations of unconstrained {−1,1} quadratic ...
Finding solutions to least-squares problems with low cardinality has found many applications, includ...
International audienceNew bounds are proposed for the subset selection problem which consists in min...
An efficient branch-and-bound algorithm for computing the best-subset regression models is proposed....
Robust statistics is a branch of statistics dealing with the analysis of data containing contaminate...
International audienceFinding solutions to least-squares problems with low cardinality has found man...
Riassunto: An efcient branch-and-bound algorithm for computing the best-subset regression models is ...
We consider a class of non-convex problems, with application to robust regression and robust support...
Several strategies for computing the best subset regression models are proposed. Some of the algorit...
This thesis considers optimization techniques with applications in assignment and generalized linear...
Semidefinite relaxation (SDR) is a powerful tool to estimate bounds and obtain approximate solutions...
International audienceSparse optimization focuses on finding a solution to least-squares problems wi...
Many engineering optimization problems can be formulated as nonconvex nonlinear pro-gramming problem...
Two fast group subset selection (GSS) algorithms for the linear regression model are proposed in thi...
We consider low-rank semidefinite programming (LRSDP) relaxations of unconstrained {−1,1} quadratic ...
Finding solutions to least-squares problems with low cardinality has found many applications, includ...
International audienceNew bounds are proposed for the subset selection problem which consists in min...
An efficient branch-and-bound algorithm for computing the best-subset regression models is proposed....
Robust statistics is a branch of statistics dealing with the analysis of data containing contaminate...
International audienceFinding solutions to least-squares problems with low cardinality has found man...
Riassunto: An efcient branch-and-bound algorithm for computing the best-subset regression models is ...
We consider a class of non-convex problems, with application to robust regression and robust support...
Several strategies for computing the best subset regression models are proposed. Some of the algorit...
This thesis considers optimization techniques with applications in assignment and generalized linear...
Semidefinite relaxation (SDR) is a powerful tool to estimate bounds and obtain approximate solutions...
International audienceSparse optimization focuses on finding a solution to least-squares problems wi...
Many engineering optimization problems can be formulated as nonconvex nonlinear pro-gramming problem...
Two fast group subset selection (GSS) algorithms for the linear regression model are proposed in thi...
We consider low-rank semidefinite programming (LRSDP) relaxations of unconstrained {−1,1} quadratic ...