Signed-rank tests for location in the symmetric independent component model

Nordhausen, Klaus; Oja, Hannu; Paindaveine, Davy

doi:10.1016/j.jmva.2008.08.004

Cited by 13 publications

(9 citation statements)

References 18 publications

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“…Beyond the role that it plays in detecting departures from ellipticity, invariant co‐ordinate selection (ICS) is potentially useful to choose a proper model for the data at hand among the many multivariate models that are available in the literature: (mixtures of) elliptical models, the independent component (IC) models of (see also Nordhausen et al . (2009b)), skew elliptical models (see, for example, Genton (2004)), etc.…”

Section: Discussion On the Paper By Tyler Critchley Dümbgen And Ojamentioning

confidence: 99%

Invariant Co-Ordinate Selection

Tyler

Critchley

Dümbgen

et al. 2009

Journal of the Royal Statistical Society Series B: Statistical Methodology

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112

132

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Summary.A general method for exploring multivariate data by comparing different estimates of multivariate scatter is presented. The method is based on the eigenvalue-eigenvector decomposition of one scatter matrix relative to another. In particular, it is shown that the eigenvectors can be used to generate an affine invariant co-ordinate system for the multivariate data. Consequently, we view this method as a method for invariant co-ordinate selection. By plotting the data with respect to this new invariant co-ordinate system, various data structures can be revealed. For example, under certain independent components models, it is shown that the invariant coordinates correspond to the independent components. Another example pertains to mixtures of elliptical distributions. In this case, it is shown that a subset of the invariant co-ordinates corresponds to Fisher's linear discriminant subspace, even though the class identifications of the data points are unknown. Some illustrative examples are given.

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Section: Discussion On the Paper By Tyler Critchley Dümbgen And Ojamentioning

confidence: 99%

Invariant Co-Ordinate Selection

Tyler

Critchley

Dümbgen

et al. 2009

Journal of the Royal Statistical Society Series B: Statistical Methodology

Self Cite

112

132

View full text Add to dashboard Cite

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“…Hence, a graph is not affected by homogeneous scalings, translations, reflections, and rotations. This is a very desirable feature of any multidimensional data analysis method [29]- [31], and in particular of self-organizing neural networks [17]. This property is also fulfilled by the overall GHNG trees.…”

Section: Propertiesmentioning

confidence: 88%

The Growing Hierarchical Neural Gas Self-Organizing Neural Network

Palomo

López‐Rubio

2016

IEEE Trans. Neural Netw. Learning Syst.

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The growing neural gas (GNG) self-organizing neural network stands as one of the most successful examples of unsupervised learning of a graph of processing units. Despite its success, little attention has been devoted to its extension to a hierarchical model, unlike other models such as the self-organizing map, which has many hierarchical versions. Here, a hierarchical GNG is presented, which is designed to learn a tree of graphs. Moreover, the original GNG algorithm is improved by a distinction between a growth phase where more units are added until no significant improvement in the quantization error is obtained, and a convergence phase where no unit creation is allowed. This means that a principled mechanism is established to control the growth of the structure. Experiments are reported, which demonstrate the self-organization and hierarchy learning abilities of our approach and its performance for vector quantization applications.

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“…As mentioned above, this can be done using either inner or outer standardization. In the context of MANOVA, the use of outer standardization is appropriate when the dependent variables are on the same scale, whereas when they are not on the same scale, inner standardization should be used [45]. Thus, the decision as to which standardization approach the researcher will use should be based on the nature of the data itself.…”

Section: Spatial Signs and Spatial Ranksmentioning

confidence: 99%

Comparison of Multivariate Means across Groups with Ordinal Dependent Variables: A Monte Carlo Simulation Study

Finch

2016

Front. Appl. Math. Stat.

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Multivariate analysis of variance (MANOVA) is a widely used technique for simultaneously comparing means for multiple dependent variables across two or more groups. MANOVA rests on several assumptions, including that of multivariate normality. Much prior research has investigated the performance of standard MANOVA with continuous, nonnormally distributed variables. However, very little work has examined its performance when the dependent variables are ordinal in nature. Therefore, the current study was designed to investigate the performance of standard MANOVA with ordinal dependent variables, and to compare it with several alternatives that might prove superior in this context. Results of the simulation study demonstrated that methods based on ranks, and spatial ranks and signs were optimal in terms of controlling the Type I error rate and maintaining reasonably high power. All of the methods considered here were applied to an existing dataset, and implications of the study results for practice are discussed.

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Signed-rank tests for location in the symmetric independent component model

Cited by 13 publications

References 18 publications

Invariant Co-Ordinate Selection

Invariant Co-Ordinate Selection

The Growing Hierarchical Neural Gas Self-Organizing Neural Network

Comparison of Multivariate Means across Groups with Ordinal Dependent Variables: A Monte Carlo Simulation Study

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