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Soit x1 ≤ x2, ≤ … ≤ xn—m + 1 ≤… ≤xn—p+1≤…≤ xn un échantillon ordonné de taille n d'une distribution dont F(x) et T(x) sont respectivement la fonction de répartition et la fonction de densité.
Nous appelons xn—m+1 la valeur de rang m de l'échantillon (x1, x2,…xn).
Pour simplifier l'écriture nous remplacerons partout l'indice n — m + I par m.
Avec cette convention nous notons la valeur caractéristique de rang m et l'intensité de rang m respectivement par um et αm [I].
Par définition on a:
Notons enfin par Fm (x) et Tm (x) la fonction de répartition et la fonction de densité de xm pour n → ∞ et m fixe.
2.1. Avant de résumer les différents points traités dans cette note, rappelons les particularités qui caractérisent la distribution asymptotique de la plus grande valeur x1 d'un échantillon. On sait que cette distribution existe si et seulement si la fonction de répartition F(x) appartient à un des trois types suivants [2]:
a) Type I: F(x) est du type exponentiel.
Le domaine de x est illimité vers la droite et F(x) tend vers I pour x → + ∞ au moins aussi rapidement qu'une fonction exponentielle.
Tous les moments de F(x) existent.
b) Type II: F(x) est du type de Cauchy.
Le domaine de x est illiminté vers la droite.
I. Suppose that the claims experienced by a portfolio could be represented as independent random variables with a distribution function F(x). The net premium per claim for an excess loss cover above an amount of L is then
If we have no information about F(x) except a number M of independent claims, we might compute the observed “staircase” distribution function SM (x) which is for every x an unbiased estimate of F(x), and could thus compute an unbiased estimate for P(L) with the variance [7])
2. In real life we have some qualitative knowledge of F(x) and very limited information about the claims. In his introduction to this subject Beard treats the case where the only information about F(x) consists of the largest claim xi and the number of claims ni (i = 1, 2, …, N) observed during N periods (Reference No 2). It is known from the theory of extreme values [3] that for large ni the distribution of xi depends mainly on the parameters uni and αni( defined by
Beard further assumes that F(x) belongs to what is called by Gumbel “the exponential type” of distribution functions, which have an unlimited tail and finite moments. This class is strictly defined by Gnedenko's necessary and sufficient condition [4, p. 68]:
