2019
DOI: 10.1007/s00184-019-00742-5
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Testing marginal homogeneity of a continuous bivariate distribution with possibly incomplete paired data

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Cited by 5 publications
(7 citation statements)
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“…is open and convex, compare with Gaigall (2019). While we allow any dependence structure between X j,1 and X j,2 , we like to infer the null hypothesis of marginal homogeneity H : P X j,1 = P X j,2 versus K : P X j,1 = P X j,2 .…”
Section: Testing Marginal Homogeneity In Hilbert Spacesmentioning
confidence: 99%
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“…is open and convex, compare with Gaigall (2019). While we allow any dependence structure between X j,1 and X j,2 , we like to infer the null hypothesis of marginal homogeneity H : P X j,1 = P X j,2 versus K : P X j,1 = P X j,2 .…”
Section: Testing Marginal Homogeneity In Hilbert Spacesmentioning
confidence: 99%
“…Given that α ∈ (0, 1) is the significance level, neither a (1 − α)-quantile c n,1−α of CvM n nor the (1 − α)-quantile c 1−α of Z is available as critical value in applications. To resolve this problem, we propose the estimation of the quantiles via bootstrapping in the spirit of Efron (1979) and follow the idea in Gaigall (2019), where the usual two-sample Cramér-von-Mises distance is applied to bivariate random vectors with values in R 2 . Note that under the null hypothesis…”
Section: Asymptotic Theory Of the Test Statisticmentioning
confidence: 99%
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