Distribution-free high-dimensional two-sample tests based on discriminating hyperplanes
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Publication:1694021
DOI10.1007/s11749-015-0467-xOpenAlexW2221926716MaRDI QIDQ1694021
Munmun Biswas, Anil Kumar Ghosh
Publication date: 1 February 2018
Published in: Test (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11749-015-0467-x
support vector machinessign testWilcoxon-Mann-Whitney statisticKolmogorov-Smirnov statisticsigned rank testdistance-weighted discrimination
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Cites Work
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- Distance-Weighted Discrimination
- A two sample test in high dimensional data
- A simple multiway ANOVA for functional data
- A test for the mean vector with fewer observations than the dimension under non-normality
- PCA consistency in high dimension, low sample size context
- A multivariate two-sample test based on the number of nearest neighbor type coincidences
- Multivariate generalizations of the Wald-Wolfowitz and Smirnov two-sample tests
- On the efficiency of multivariate spatial sign and rank tests
- On a new multivariate two-sample test.
- On distribution-free tests for the multivariate two-sample location-scale model
- Some theory for Fisher's linear discriminant function, `naive Bayes', and some alternatives when there are many more variables than observations
- The control of the false discovery rate in multiple testing under dependency.
- Optimal tests for multivariate location based on interdirections and pseudo-Mahalanobis ranks.
- A test for the mean vector in large dimension and small samples
- A two-sample test for high-dimensional data with applications to gene-set testing
- The Rahman polynomials and the Lie algebra $\mathfrak{sl}_{3}(\mathbb{C})$
- On some exact distribution-free one-sample tests for high dimension low sample size data
- A Distribution-Free Multivariate Sign Test Based on Interdirections
- Multivariate Two-Sample Tests Based on Nearest Neighbors
- Sign Tests in Multidimension: Inference Based on the Geometry of the Data Cloud
- An Approach to Multivariate Rank Tests in Multivariate Analysis of Variance
- A Quality Index Based on Data Depth and Multivariate Rank Tests
- Weighted Distance Weighted Discrimination and Its Asymptotic Properties
- Geometric Representation of High Dimension, Low Sample Size Data
- An Exact Distribution-Free Test Comparing Two Multivariate Distributions based on Adjacency
