A modified version of the Kolmogorov-Smirnov (KS) test is presented as a tool to assess whether a specified, although arbitrary, probability model is unsuitable to describe the underlying distribution of a set of observations. The KS test computes distances between points of the sample cumulative distribution function and the hypothetical one as absolute differences between them, and then considering the supreme distance as test statistics. The modification here proposed consists of computing the mentioned distances as Aitchison distances of the probabilities as two part compositions. In this contribution, we investigate by simulation the asymptotic distribution of the proposed test statistic, checking the appropriateness of the Gumbel distribution. The properties of the asymptotic distribution are studied for samples coming from generic distributions such as uniform, normal, lognormal, gamma, beta and exponential with different values of the parameters. A brief Monte Carlo investigation is made of the type I error and power of the test.

Monti, G., Mateu-Figueras, G., Ortego, M., Pawlowsky-Glahn, V., Egozcue, J. (2017). Modified Multivariate Kolmogorov-Smirnov Test of Goodness of Fit. In The Seventh International Workshop on Compositional Data Analysis - Proceedings book (pp.152-158). Karel Hron and Raimon Tolosana-Delgado.

Modified Multivariate Kolmogorov-Smirnov Test of Goodness of Fit

Monti, GS
Primo
;
2017

Abstract

A modified version of the Kolmogorov-Smirnov (KS) test is presented as a tool to assess whether a specified, although arbitrary, probability model is unsuitable to describe the underlying distribution of a set of observations. The KS test computes distances between points of the sample cumulative distribution function and the hypothetical one as absolute differences between them, and then considering the supreme distance as test statistics. The modification here proposed consists of computing the mentioned distances as Aitchison distances of the probabilities as two part compositions. In this contribution, we investigate by simulation the asymptotic distribution of the proposed test statistic, checking the appropriateness of the Gumbel distribution. The properties of the asymptotic distribution are studied for samples coming from generic distributions such as uniform, normal, lognormal, gamma, beta and exponential with different values of the parameters. A brief Monte Carlo investigation is made of the type I error and power of the test.
paper
Gumbel distribution, Monte Carlo Simulations, Empirical Cumulative Distribution Function
English
CoDaWork 2017 - The 7th International Workshop on Compositional Data Analysis
2017
Hron, K; Tolosana-Delgado, R
The Seventh International Workshop on Compositional Data Analysis - Proceedings book
978-84-947240-0-8
5-giu-2017
2017
152
158
none
Monti, G., Mateu-Figueras, G., Ortego, M., Pawlowsky-Glahn, V., Egozcue, J. (2017). Modified Multivariate Kolmogorov-Smirnov Test of Goodness of Fit. In The Seventh International Workshop on Compositional Data Analysis - Proceedings book (pp.152-158). Karel Hron and Raimon Tolosana-Delgado.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/177114
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