SOCP relaxation bounds for the optimal subset selection problem applied to robust linear regression
Author
dc.contributor.author
Flores, Salvador
Admission date
dc.date.accessioned
2015-09-28T13:23:23Z
Available date
dc.date.available
2015-09-28T13:23:23Z
Publication date
dc.date.issued
2015
Cita de ítem
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European Journal of Operational Research 246 (2015) 44–50
en_US
Identifier
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DOI: 10.1016/j.ejor.2015.04.024
Identifier
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https://repositorio.uchile.cl/handle/2250/133890
General note
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Artículo de publicación ISI
en_US
Abstract
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This 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 strategy in the BB algorithm that results in a significant reduction in computing time, at the price of a negligeable accuracy lost. The novelty of our algorithm is that the bounds at nodes of the BB tree come from pseudo-convexifications derived using a linearization technique with approximate bounds for the nonlinear terms. The approximate bounds are computed solving an auxiliary semidefinite optimization problem. We show through a computational study that our algorithm performs well in a wide set of the most difficult instances of the LTSE problem.