The spectral measure plays a key role in the statistical modeling of multivariate extremes. Estimation of the spectral measure is a complex issue, given the need to obey a certain moment condition. We propose a Euclidean likelihood-based estimator for the spectral measure which is simple and explicitly defined, with its expression being free of Lagrange multipliers. Our estimator is shown to have the same limit distribution as the maximum empirical likelihood estimator of J. H. J. Einmahl and J. Segers, Annals of Statistics 37(5B), 2953–2989 (2009). Numerical experiments suggest an overall good performance and identical behavior to the maximum empirical likelihood estimator. We illustrate the method in an extreme temperature data analysis
Let (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function F which...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
The spectral measure plays a key role in the statistical modeling of multivariate extremes. Estimati...
The spectral measure plays a key role in the statistical modeling of multivariate extremes. Estimati...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
The tail of a bivariate distribution function in the domain of attraction of a bivariate extreme val...
Let 11 nn be a random sample from a bivariate distri-bution functionF in the domain of max...
The tail of a bivariate distribution function in the domain of attraction of a bivariate extreme-val...
Universite ́ Catholique de Louvain Abstract. In the world of multivariate extremes, estimation of th...
We introduce a density regression model for the spectral density of a bivariate extreme value distri...
The tail of a bivariate distribution function in the domain of attraction of a bi-variate extreme-va...
There is an increasing interest to understand the interplay of extreme values over time and across c...
Let (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function F which...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
The spectral measure plays a key role in the statistical modeling of multivariate extremes. Estimati...
The spectral measure plays a key role in the statistical modeling of multivariate extremes. Estimati...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
Consider a random sample from a bivariate distribution function F in the max-domain of attraction of...
The traditional approach to multivariate extreme values has been through the multivariate extreme va...
The tail of a bivariate distribution function in the domain of attraction of a bivariate extreme val...
Let 11 nn be a random sample from a bivariate distri-bution functionF in the domain of max...
The tail of a bivariate distribution function in the domain of attraction of a bivariate extreme-val...
Universite ́ Catholique de Louvain Abstract. In the world of multivariate extremes, estimation of th...
We introduce a density regression model for the spectral density of a bivariate extreme value distri...
The tail of a bivariate distribution function in the domain of attraction of a bi-variate extreme-va...
There is an increasing interest to understand the interplay of extreme values over time and across c...
Let (X1, Y1), (X2, Y2),…, (Xn, Yn) be a random sample from a bivariate distribution function F which...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
Consider a random sample in the max-domain of attraction of a multivariate extreme value distributio...
Add to ORKG