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Asymptotics of joint maxima for discontinuous random variables
- Source :
- Extremes, 13 (1)
- Publication Year :
- 2018
-
Abstract
- This paper explores the joint extreme-value behavior of discontinuous random variables. It is shown that as in the continuous case, the latter is characterized by the weak limit of the normalized componentwise maxima and the convergence of any compatible copula. Illustrations are provided and an extension to the case of triangular arrays is considered which sheds new light on recent work of Coles and Pauli (Stat Probab Lett 54:373–379, 2001) and Mitov and Nadarajah (Extremes 8:357–370, 2005). This leads to considerations on the meaning of the bivariate upper tail dependence coefficient of Joe (Comput Stat Data Anal 16:279–297, 1993) in the discontinuous case.<br />Extremes, 13 (1)<br />ISSN:1386-1999<br />ISSN:1572-915X
- Subjects :
- Statistics and Probability
Economics, Econometrics and Finance (miscellaneous)
Copula
Discrete distribution
Joint extremes
Maximum
Upper tail dependence
Triangular array
2001 Economics, Econometrics and Finance (miscellaneous)
Bivariate analysis
Copula (probability theory)
symbols.namesake
Pauli exclusion principle
510 Mathematics
Calculus
2613 Statistics and Probability
Engineering (miscellaneous)
Mathematics
Mathematical analysis
Tail dependence
10123 Institute of Mathematics
symbols
Probability distribution
2201 Engineering (miscellaneous)
Maxima
Random variable
Subjects
Details
- Language :
- English
- ISSN :
- 13861999 and 1572915X
- Database :
- OpenAIRE
- Journal :
- Extremes, 13 (1)
- Accession number :
- edsair.doi.dedup.....7502a80652acc94e1e995906980e3c82