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      A Survey on Multidimensional Scaling

      1 , 2 , 3 , 4
      ACM Computing Surveys
      Association for Computing Machinery (ACM)

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          Analysis of individual differences in multidimensional scaling via an n-way generalization of “Eckart-Young” decomposition

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            A global geometric framework for nonlinear dimensionality reduction.

            Scientists working with large volumes of high-dimensional data, such as global climate patterns, stellar spectra, or human gene distributions, regularly confront the problem of dimensionality reduction: finding meaningful low-dimensional structures hidden in their high-dimensional observations. The human brain confronts the same problem in everyday perception, extracting from its high-dimensional sensory inputs-30,000 auditory nerve fibers or 10(6) optic nerve fibers-a manageably small number of perceptually relevant features. Here we describe an approach to solving dimensionality reduction problems that uses easily measured local metric information to learn the underlying global geometry of a data set. Unlike classical techniques such as principal component analysis (PCA) and multidimensional scaling (MDS), our approach is capable of discovering the nonlinear degrees of freedom that underlie complex natural observations, such as human handwriting or images of a face under different viewing conditions. In contrast to previous algorithms for nonlinear dimensionality reduction, ours efficiently computes a globally optimal solution, and, for an important class of data manifolds, is guaranteed to converge asymptotically to the true structure.
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              A General Coefficient of Similarity and Some of Its Properties

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                Author and article information

                Journal
                ACM Computing Surveys
                ACM Comput. Surv.
                Association for Computing Machinery (ACM)
                0360-0300
                1557-7341
                July 16 2018
                July 16 2018
                : 51
                : 3
                : 1-25
                Affiliations
                [1 ]King Abdullah University of Science and Technology (KAUST), KSA, Thuwal, Makkah
                [2 ]Hanyang University, South Korea, Ansan, South Korea
                [3 ]University of Engineering and Technology, Pakistan
                [4 ]Dawood University of Engineering and Technology, Pakistan
                Article
                10.1145/3178155
                17152442
                7fd786f3-bed4-40e0-a855-cb2bc3df0710
                © 2018

                http://www.acm.org/publications/policies/copyright_policy#Background

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