2018
DOI: 10.1109/tsp.2018.2849734
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A Fast Matrix Majorization-Projection Method for Penalized Stress Minimization With Box Constraints

Abstract: Abstract-Kruskal's stress minimization, though nonconvex and nonsmooth, has been a major computational model for dissimilarity data in multidimensional scaling. Semidefinite Programming (SDP) relaxation (by dropping the rank constraint) would lead to a high number of SDP cone constraints. This has rendered the SDP approach computationally challenging even for problems of small size. In this paper, we reformulate the stress optimization as an Euclidean Distance Matrix (EDM) optimization with box constraints. A … Show more

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Cited by 22 publications
(48 citation statements)
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“…Now we give the details of majorized penalty approach as shown in (3.2). Similar as in [35,Theorem 3.2], the majorized penalty approach enjoys the following convergence result.…”
Section: Majorized Penalty Approachmentioning
confidence: 77%
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“…Now we give the details of majorized penalty approach as shown in (3.2). Similar as in [35,Theorem 3.2], the majorized penalty approach enjoys the following convergence result.…”
Section: Majorized Penalty Approachmentioning
confidence: 77%
“…To deal with the rank constraint, we make use of the majorized technique proposed in [35,36], which is detailed below.…”
Section: Tackling Rank Constraintmentioning
confidence: 99%
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