Statistics for near independence in multivariate extreme values

We propose a multivariate extreme value threshold model for joint tail estimation which overcomes the problems encountered with existing techniques when the variables are near independence. We examine inference under the model and develop tests for independence of extremes of the marginal variables, both when the thresholds are fixed, and when they increase with the sample size. Motivated by results obtained from this model, we give a new and widely applicable characterisation of dependence in the joint tail which includes existing models as special cases. A new parameter which governs the form of dependence is of fundamental importance to this characterisation. By estimating this parameter, we develop a diagnostic test which assesses the applicability of bivariate extreme value joint tail models. The methods are demonstrated through simulation and by analysing two previously published data sets.

[1]  Richard L. Smith,et al.  Markov chain models for threshold exceedances , 1997 .

[2]  H. Joe Multivariate extreme value distributions , 1997 .

[3]  Jonathan A. Tawn,et al.  Contribution to discussion of the paper by Cheng and Traylor. , 1995 .

[4]  S. Coles,et al.  Statistical Methods for Multivariate Extremes: An Application to Structural Design , 1994 .

[5]  Richard L. Smith,et al.  Multivariate Threshold Methods , 1994 .

[6]  Sidney I. Resnick,et al.  Estimating the limit distribution of multivariate extremes , 1993 .

[7]  Harry Joe,et al.  Bivariate Threshold Methods for Extremes , 1992 .

[8]  S. Coles,et al.  Modelling Extreme Multivariate Events , 1991 .

[9]  Richard L. Smith,et al.  Models for exceedances over high thresholds , 1990 .

[10]  Laurens de Haan,et al.  Fighting the arch–enemy with mathematics‘ , 1990 .

[11]  J. Tawn Modelling multivariate extreme value distributions , 1990 .

[12]  Richard L. Smith Extreme Value Analysis of Environmental Time Series: An Application to Trend Detection in Ground-Level Ozone , 1989 .

[13]  R. Reiss Approximate Distributions of Order Statistics: With Applications to Nonparametric Statistics , 1989 .

[14]  L. Haan,et al.  A moment estimator for the index of an extreme-value distribution , 1989 .

[15]  Jonathan A. Tawn,et al.  Bivariate extreme value theory: Models and estimation , 1988 .

[16]  S. Resnick Extreme Values, Regular Variation, and Point Processes , 1987 .

[17]  K. Liang,et al.  Asymptotic Properties of Maximum Likelihood Estimators and Likelihood Ratio Tests under Nonstandard Conditions , 1987 .

[18]  Richard L. Smith Maximum likelihood estimation in a class of nonregular cases , 1985 .

[19]  D. Clayton A model for association in bivariate life tables and its application in epidemiological studies of familial tendency in chronic disease incidence , 1978 .

[20]  S. Resnick,et al.  Limit theory for multivariate sample extremes , 1977 .

[21]  B. M. Hill,et al.  A Simple General Approach to Inference About the Tail of a Distribution , 1975 .

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

[23]  James Pickands,et al.  The two-dimensional Poisson process and extremal processes , 1971, Journal of Applied Probability.

[24]  Masaaki Sibuya,et al.  Bivariate extreme statistics, I , 1960 .

[25]  K. Chung,et al.  Limit Distributions for Sums of Independent Random Variables , 1955 .

[26]  W. Feller An Introduction to Probability Theory and Its Applications , 1959 .

[27]  Feller William,et al.  An Introduction To Probability Theory And Its Applications , 1950 .

[28]  Barnes Discussion of the Paper , 1961, Public health papers and reports.