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A new test procedure of independence in copula models via chi-square-divergence

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 Added by Salim Bouzebda
 Publication date 2011
and research's language is English




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We introduce a new test procedure of independence in the framework of parametric copulas with unknown marginals. The method is based essentially on the dual representation of $chi^2$-divergence on signed finite measures. The asymptotic properties of the proposed estimate and the test statistic are studied under the null and alternative hypotheses, with simple and standard limit distributions both when the parameter is an interior point or not.



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We introduce new estimates and tests of independence in copula models with unknown margins using $phi$-divergences and the duality technique. The asymptotic laws of the estimates and the test statistics are established both when the parameter is an interior or a boundary value of the parameter space. Simulation results show that the choice of $chi^2$-divergence has good properties in terms of efficiency-robustness.
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