2020
DOI: 10.48550/arxiv.2010.03279
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Exchangeable min-id sequences: Characterization, exponent measures and non-decreasing id-processes

Abstract: We establish a correspondence between exchangeable sequences of random variables whose finite-dimensional distributions are min-(or max-) infinitely divisible and non-negative, non-decreasing, infinitely divisible stochastic processes. The exponent measure of a min-id sequence is shown to be the sum of a very simple "drift measure" and a mixture of product probability measures, which corresponds uniquely to the Lévy measure of a non-decreasing infinitely divisible process. The latter is shown to be supported o… Show more

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Cited by 1 publication
(8 citation statements)
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References 44 publications
(106 reference statements)
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“…Assumption 1 requires that h X = 0, which is satisfied for every max-id sequence after suitable transformations of the margins. [2] describe the structure of exponent measures of exchangeable min-id sequences, i.e. of exchangeable sequences 1/X, where X is max-id.…”
Section: Exact Simulation Of Max-id Random Vectorsmentioning
confidence: 99%
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“…Assumption 1 requires that h X = 0, which is satisfied for every max-id sequence after suitable transformations of the margins. [2] describe the structure of exponent measures of exchangeable min-id sequences, i.e. of exchangeable sequences 1/X, where X is max-id.…”
Section: Exact Simulation Of Max-id Random Vectorsmentioning
confidence: 99%
“…This characterization is the analog to the usual Lévy-Khintchine triplet of infinitely-divisible distributions on R d [18]. The results of [2] imply that 1/X := (1/X i ) i∈N has the de Finetti type stochastic representation…”
Section: Introductionmentioning
confidence: 96%
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