1. Kernel estimators for the second order parameter in extreme value statistics
- Author
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Goegebeur, Yuri, Beirlant, Jan, and de Wet, Tertius
- Subjects
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KERNEL functions , *PARAMETER estimation , *EXTREME value theory , *DISTRIBUTION (Probability theory) , *SIMULATION methods & models , *ASYMPTOTIC expansions , *MATHEMATICAL transformations , *MATHEMATICAL models - Abstract
Abstract: We develop and study in the framework of Pareto-type distributions a general class of kernel estimators for the second order parameter , a parameter related to the rate of convergence of a sequence of linearly normalized maximum values towards its limit. Inspired by the kernel goodness-of-fit statistics introduced in , for which the mean of the normal limiting distribution is a function of , we construct estimators for using ratios of ratios of differences of such goodness-of-fit statistics, involving different kernel functions as well as power transformations. The consistency of this class of estimators is established under some mild regularity conditions on the kernel function, a second order condition on the tail function 1−F of the underlying model, and for suitably chosen intermediate order statistics. Asymptotic normality is achieved under a further condition on the tail function, the so-called third order condition. Two specific examples of kernel statistics are studied in greater depth, and their asymptotic behavior illustrated numerically. The finite sample properties are examined by means of a simulation study. [Copyright &y& Elsevier]
- Published
- 2010
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