Abstract
AbstractThe problem of inferring the distribution of a random vector given that its norm is large requires modeling a homogeneous limiting density. We suggest an approach based on graphical models which is suitable for high-dimensional vectors. We introduce the notion of one-component regular variation to describe a function that is regularly varying in its first component. We extend the representation and Karamata's theorem to one-component regularly varying functions, probability distributions and densities, and explain why these results are fundamental in multivariate extreme-value theory. We then generalize the Hammersley–Clifford theorem to relate asymptotic conditional independence to a factorization of the limiting density, and use it to model multivariate tails.
Publisher
Cambridge University Press (CUP)
Subject
Statistics, Probability and Uncertainty,General Mathematics,Statistics and Probability
Reference29 articles.
1. Regular variation and generalized domains of attraction in k
2. An interpretation of some aspects of Karamata’s theory of regular variation;Seneta;Publ. Inst. Math. (Beograd) (N.S.),1973
3. Probability
4. Spatial extremes: max-stable processes at work;Ribatet;J. Soc. Française Statist.,2013
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