In the intuitive approach, a distribution function $F$ is said to be not more heavily tailed than $G$ if $\lim \sup_{x \rightarrow \infty} \bar{F}/\bar{G} < \infty$. An alternative is to consider the behavior of the ratio $F^{-1}(u)/G^{-1}(u)$, in a neighborhood of one. The present paper examines the relationship between these two criteria and concludes that the intuitive approach gives a more thorough comparison of distribution functions than the ratio of the quantile functions approach in the case $F$ or $G$ have tails that decrease faster than, or at, an exponential rate. If $F$ or $G$ have slowly varying tails, the intuitive approach gives a less thorough comparison of distributions. When $F$ or $G$ have polynomial tails, the approaches agree.

Publié le : 1992-03-14
Classification:  Tail-orderings,  quantile functions,  density-quantile functions,  exponential tails,  polynomial tails,  swiftly varying tails,  scale-invariant tails,  62E10,  62B15,  60E05

@article{1176348541,
     author = {Rojo, Javier},
     title = {A Pure-Tail Ordering Based on the Ratio of the Quantile Functions},
     journal = {Ann. Statist.},
     volume = {20},
     number = {1},
     year = {1992},
     pages = { 570-579},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176348541}
}

Rojo, Javier. A Pure-Tail Ordering Based on the Ratio of the Quantile Functions. Ann. Statist., Tome 20 (1992) no. 1, pp.  570-579. http://gdmltest.u-ga.fr/item/1176348541/