论文信息 - Extreme value analysis of epoch maxima—convergence, and choice of asymptote

Extreme value analysis of epoch maxima—convergence, and choice of asymptote

Abstract Cramer's methodology is used to derive the Type I and Type III extreme value asymptotes. The method demonstrates that both methods involve a common limiting process followed in each case by an appropriate approximation of the parent. This highlights the importance of convergence if good predictions of design values are to be obtained. It is shown that the Type III asymptote requires not just an upper limit but quite stringent mathematical conditions to hold at that limit. This implies the need to demonstrate that the underlying physics exist to create such a limit. An alternative class of right-limited distributions exists which have the Type I asymptote, and are equally if not more plausible models for phenomena right-limited by a physical effect. This class cannot be distinguished from Type III unless the parent is known. Poorly converged Type I examples are also indistinguishable from Type III, if the observations are well below the upper limit. The conclusion is that pursuit of the Type III option should be abandoned. Ensuring proper pre-conditioning before fitting the Type I asymptote offers better prospects for fitting observed extremes.

R. I. Harris | R. I Harris

[1] William H. Press,et al. Numerical recipes , 1990 .

[2] J. Pickands. Statistical Inference Using Extreme Order Statistics , 1975 .

[3] J. R. Wallis,et al. Estimation of the generalized extreme-value distribution by the method of probability-weighted moments , 1985 .

[4] R. Fisher,et al. Limiting forms of the frequency distribution of the largest or smallest member of a sample , 1928, Mathematical Proceedings of the Cambridge Philosophical Society.

[5] J. D. T. Oliveira,et al. The Asymptotic Theory of Extreme Order Statistics , 1979 .

[6] E. Gumbel,et al. Statistics of extremes , 1960 .

[7] Jean Palutikof,et al. A review of methods to calculate extreme wind speeds , 1999 .

[8] Nicholas J. Cook,et al. Discussion on Application of the generalized Pareto distribution to extreme value analysis in wind engineering by J.D. Holmes, W.W. Moriarty , 2001 .

[9] J. Holmes,et al. Application of the generalized Pareto distribution to extreme value analysis in wind engineering , 1999 .

[10] Enrique Castillo. Extreme value theory in engineering , 1988 .

[11] R. I. Harris. Gumbel re-visited - a new look at extreme value statistics applied to wind speeds , 1996 .

[12] Nicholas J. Cook,et al. Towards better estimation of extreme winds , 1982 .

[13] N. Cook,et al. Extreme wind speeds in mixed climates revisited , 2003 .

[14] R. I. Harris. The accuracy of design values predicted from extreme value analysis , 2001 .