Supremum self-decomposable random vectors (Q1081189)

scientific article; zbMATH DE number 3969756

Language	Label	Description	Also known as
English	Supremum self-decomposable random vectors	scientific article; zbMATH DE number 3969756

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instance of

scholarly article

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title

Supremum self-decomposable random vectors (English)

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author

Gerard Gerritse

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publication date

1986

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review text

An \({\bar {\mathbb{R}}}^ d\)-valued random variable X is said to be sup selfdecomposable if for each \(t>0\) there is an \({\bar {\mathbb{R}}}^ d\)- valued random variable \(X_ t\) independent of X such that \[ (1)\quad X=^{d}(X-t\cdot 1)\vee X_ t, \] where \(=^{d}\) means equality in distribution and \(\vee\) means componentwise supremum. The equality (1) is motivated by the characterization \(X=^{d}e^{-t} X+X_ t\) of selfdecomposable measures. The author characterizes sup selfdecomposable measures as limit distributions, where partial sums are replaced by partial maxima. Also sup infinite divisible and sub stable measures are discussed.

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reviewed by

Zbigniew J. Jurek

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zbMATH Keywords

sup selfdecomposable

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selfdecomposable measures

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sup infinite divisible

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sub stable measures