Estimating the multivariate extremal index function

Christian Y. Robert

doi:10.3150/08-BEJ145

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Home > Journals > Bernoulli > Volume 14 > Issue 4 > Article

November 2008 Estimating the multivariate extremal index function

Christian Y. Robert

Bernoulli 14(4): 1027-1064 (November 2008). DOI: 10.3150/08-BEJ145

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Abstract

The multivariate extremal index function relates the asymptotic distribution of the vector of pointwise maxima of a multivariate stationary sequence to that of the independent sequence from the same stationary distribution. It also measures the degree of clustering of extremes in the multivariate process. In this paper, we construct nonparametric estimators of this function and prove their asymptotic normality under long-range dependence and moment conditions. The results are illustrated by means of a simulation study.

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Christian Y. Robert. "Estimating the multivariate extremal index function." Bernoulli 14 (4) 1027 - 1064, November 2008. https://doi.org/10.3150/08-BEJ145