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dc.contributor.authorGiloni, Avi-
dc.contributor.authorSengupta, Bhaskar-
dc.contributor.authorSimonoff, Jeffrey-
dc.date.accessioned2008-05-25T15:39:37Z-
dc.date.available2008-05-25T15:39:37Z-
dc.date.issued2004-07-23-
dc.identifier.urihttp://hdl.handle.net/2451/26318-
dc.description.abstractThis paper discusses a novel application of mathematical programming techniques to a regression problem. While least squares regression techniques have been used for a long time, it is known that their robustness properties are not desirable. Specifically, the estimators are known to be too sensitive to data contamination. In this paper we examine regressions based on Least-sum of Absolute Deviations (LAD) and show that the robustness of the estimator can be improved significantly through a judicious choice of weights. The problem of finding optimum weights is formulated as a nonlinear mixed integer program, which is too difficult to solve exactly in general. We demonstrate that our problem is equivalent to one similar to the knapsack problem and then solve it for a special case. We then generalize this solution to general regression designs. Furthermore, we provide an efficient algorithm to solve the general non-linear, mixed integer programming problem when the number of predictors is small. We show the efficacy of the weighted LAD estimator using numerical examples.en
dc.languageEnglishEN
dc.language.isoen_USen
dc.publisherStern School of Business, New York Universityen
dc.relation.ispartofseriesSOR-2004-2en
dc.subjectAlgorithmsen
dc.subjectBreakdown pointen
dc.subjectKnapsack problemen
dc.subjectNonlinear mixed integer programmingen
dc.subjectRobust regressionen
dc.titleA Mathematical Programming Approach for Improving the Robustness of LAD Regressionen
dc.typeWorking Paperen
dc.description.seriesStatistics Working Papers SeriesEN
Appears in Collections:IOMS: Statistics Working Papers

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