A strong approximation of the shortt process

J.H.J. Einmahl, M. Geilen

    Research output: Book/ReportReportAcademic

    67 Downloads (Pure)

    Abstract

    A shortt of a one dimensional probability distribution is defined to be an interval which has at least probability t and minimal length. The length of a shortt, U(t), and its obvious estimator, U_n(t), are significant measures of scale of a probability distribution and the corresponding random sample, respectively. The shortt process is defined to be $ \sqrt{n}(U_n(t)-U(t)) / U'(t) $, similarly to the definition of the quantile process. It is known that this process converges weakly, under natural regularity conditions, to a Brownian bridge. In this note a strong approximation of the shortt process by a Kiefer process is established, which yields the weak convergence as a corollary. Applications of the result to the global and local strong limiting behaviour of the shortt process are also presented.
    Original languageEnglish
    Place of PublicationEindhoven
    PublisherTechnische Universiteit Eindhoven
    Number of pages9
    Publication statusPublished - 1998

    Publication series

    NameMemorandum COSOR
    Volume9826
    ISSN (Print)0926-4493

    Fingerprint

    Dive into the research topics of 'A strong approximation of the shortt process'. Together they form a unique fingerprint.

    Cite this