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A family of random sup-measures with long-range dependence. (English) Zbl 1402.60064

Summary: A family of self-similar and translation-invariant random sup-measures with long-range dependence are investigated. They are shown to arise as the limit of the empirical random sup-measure of a stationary heavy-tailed process, inspired by an infinite urn scheme, where same values are repeated at several random locations. The random sup-measure reflects the long-range dependence nature of the original process, and in particular characterizes how locations of extremes appear as long-range clusters represented by random closed sets. A limit theorem for the corresponding point-process convergence is established.

MSC:

60G70 Extreme value theory; extremal stochastic processes
60F17 Functional limit theorems; invariance principles
60G57 Random measures

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References:

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