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Approximating the conditional density given large observed values via a multivariate extremes framework, with application to environmental data

Published 8 Jan 2013 in stat.AP | (1301.1428v1)

Abstract: Phenomena such as air pollution levels are of greatest interest when observations are large, but standard prediction methods are not specifically designed for large observations. We propose a method, rooted in extreme value theory, which approximates the conditional distribution of an unobserved component of a random vector given large observed values. Specifically, for $\mathbf{Z}=(Z_1,...,Z_d)T$ and $\mathbf{Z}{-d}=(Z_1,...,Z{d-1})T$, the method approximates the conditional distribution of $[Z_d|\mathbf{Z}{-d}=\mathbf{z}{-d}]$ when $|\mathbf{z}{-d}|>r*$. The approach is based on the assumption that $\mathbf{Z}$ is a multivariate regularly varying random vector of dimension $d$. The conditional distribution approximation relies on knowledge of the angular measure of $\mathbf{Z}$, which provides explicit structure for dependence in the distribution's tail. As the method produces a predictive distribution rather than just a point predictor, one can answer any question posed about the quantity being predicted, and, in particular, one can assess how well the extreme behavior is represented. Using a fitted model for the angular measure, we apply our method to nitrogen dioxide measurements in metropolitan Washington DC. We obtain a predictive distribution for the air pollutant at a location given the air pollutant's measurements at four nearby locations and given that the norm of the vector of the observed measurements is large.

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