Your search keyword '"Marek Omelka"' showing total 2 results

1. Omnibus test for covariate effects in conditional copula models

Author

Noël Veraverbeke, Marek Omelka, and Irène Gijbels

Subjects

Statistics and Probability, Numerical Analysis, Conditional dependence, Omnibus test, Nonparametric statistics, Asymptotic distribution, Covariate, Econometrics, Test statistic, Statistics::Methodology, Statistics, Probability and Uncertainty, Marginal distribution, Null hypothesis, Mathematics

Abstract

Conditional copulas describe the conditional dependence and the influence that covariates have on the dependence structure between two (or more) variables. Of interest is to test the null hypothesis that the covariates have a specific effect. This paper proposes an omnibus test for testing the null hypothesis of a specified effect of the covariates. The test statistic is designed for having power against many alternatives, and can be used to test for a variety of covariate effects (no effects, linear effects, partial effects, etc.). A special case is the testing problem that the covariates do not affect the dependence structure. In this semiparametric framework the marginal distribution functions are estimated using nonparametric kernel techniques and the parametric dependence model is estimated using maximum likelihood estimation. We establish the asymptotic distribution of the test statistic under the null hypothesis, and evaluate the finite-sample performance of the test via a simulation study, which also includes comparisons with alternative tests. A real data analysis illustrates the practical use of the test.

Published

2021

2. On the specification of multivariate association measures and their behaviour with increasing dimension

Author

Irène Gijbels, Marek Omelka, and Vojtěch Kika

Subjects

Statistics and Probability, Numerical Analysis, Multivariate statistics, Multivariate random variable, Generalization, Nonparametric statistics, 020206 networking & telecommunications, 02 engineering and technology, Bivariate analysis, 01 natural sciences, 010104 statistics & probability, Random variate, Dimension (vector space), 0202 electrical engineering, electronic engineering, information engineering, Statistics::Methodology, Applied mathematics, 0101 mathematics, Statistics, Probability and Uncertainty, Random variable, Mathematics

Abstract

In this paper the interest is to elaborate on the generalization of bivariate association measures, namely Spearman’s rho, Kendall’s tau, Blomqvist’s beta and Gini’s gamma, for a general dimension d ≥ 2 . Desirable properties and axioms for such generalizations are discussed, where special attention is given to the impact of the addition of: (i) an independent random variable to a random vector; (ii) a conical combination of all components; (iii) a set of arbitrary random components. Existing generalizations are evaluated with respect to the axiom set. For a d -variate Gini’s gamma, a simplified formula is developed, making its analytical computation easier. Further, for Archimedean and meta-elliptical copulas the asymptotic behaviour when the dimension d increases is studied. Nonparametric estimation of the considered generalizations of multivariate association measures is reviewed and a nonparametric estimator of the multivariate Gini’s gamma is introduced. The practical use of multivariate association measures is illustrated on a real data example.

Published

2021