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National Repository of Grey Literature

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	Asymptotické vlastnosti intervalových statistik Vajda, Igor ; van der Meulen, E. C. This is a continuation of our previous paper dealing with simple spacings. Here we deal with arbitrary m-spacings. We introduce new spacings statistics measuring divergence of hypothetical and empirical distributions. It is proved that they are asymptotically equivalent with all spacings statistics known from the literature. General asymptotic equivalence of this type is a new result with interesting applications. Detailed record
	Limit Laws for f-disparity Statistics under Local Alternatives Vajda, Igor Limit Laws for f-disparity Statistics under Local Alternatives Detailed record
	O asymptotických distribucích f-disparitních statistik při lokálních alternatívách Vajda, Igor Previous joint paper of the author with L. Gyorfi studying asymptotic normality of f-disparity statistics under hypotheses is extended by proving the asymptotic normality under local alternatives. The paper in fact introduces a new method of extension of the famous theorem of Morris dealing with the particular Pearson statistic. Detailed record

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