Equivalence of Minimal L0 and Lp Norm Solutions of Linear Equalities, Inequalities and Linear Programs for Sufficiently Small p

dc.contributor.author	Mangasarian, Olvi
dc.contributor.author	Fung, Glenn
dc.date.accessioned	2013-01-17T18:36:31Z
dc.date.available	2013-01-17T18:36:31Z
dc.date.issued	2011
dc.description.abstract	For a bounded system of linear equalities and inequalities we show that the NP-hard ?0 norm minimization problem min \|\|x\|\|0 subject to Ax = a, Bx ? b and \|\|x\|\|? ? 1, is completely equivalent to the concave minimization min \|\|x\|\|p subject to Ax = a, Bx ? b and \|\|x\|\|? ? 1, for a sufficiently small p. A local solution to the latter problem can be easily obtained by solving a provably finite number of linear programs. Computational results frequently leading to a global solution of the ?0 minimization problem and often producing sparser solutions than the corresponding ?1 solution are given. A similar approach applies to finding minimal ?0 solutions of linear programs.	en
dc.identifier.citation	11-02	en
dc.identifier.uri	http://digital.library.wisc.edu/1793/64358
dc.subject	linear programming	en
dc.subject	linear inequalities	en
dc.subject	linear equations	en
dc.subject	l0 minimization	en
dc.title	Equivalence of Minimal L0 and Lp Norm Solutions of Linear Equalities, Inequalities and Linear Programs for Sufficiently Small p	en
dc.type	Technical Report	en

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Description:: Equivalence of Minimal ℓ0 and ℓp Norm Solutions of Linear Equalities, Inequalities and Linear Programs for Sufficiently Small p