We study the convergence rate to normal limit law for the space requirement of random $m$-ary search trees. While it is known that the random variable is asymptotically normally distributed for $3\le m\le 26$ and that the limit law does not exist for $m>26$, we show that the convergence rate is $O(n^{-1/2})$ for $3\le m\le 19$ and is $O(n^{-3(3/2-\alpha)})$, where $4/3<\alpha<3/2$ is a parameter depending on $m$ for $20\le m\le 26$. Our approach is based on a refinement to the method of moments and applicable to other recursive random variables; we briefly mention the applications to quicksort proper and the generalized quicksort of Hennequin, where more phase changes are given. These results provide natural, concrete examples for which the Berry--Esseen bounds are not necessarily proportional to the reciprocal of the standard deviation. Local limit theorems are also derived.

Publié le : 2003-04-14
Classification:  Convergeance rates,  asymptotic normality,  phase change,  search trees,  quicksort,  method of moments,  local limit theorems

@article{1048516530,
     author = {Hwang, Hsien-Kuei},
     title = {Second phase changes in 
random $\boldsymbol{m}$-ary search trees and generalized 
quicksort: Convergence rates},
     journal = {Ann. Probab.},
     volume = {31},
     number = {1},
     year = {2003},
     pages = { 609-629},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1048516530}
}

Hwang, Hsien-Kuei. Second phase changes in 
random $\boldsymbol{m}$-ary search trees and generalized 
quicksort: Convergence rates. Ann. Probab., Tome 31 (2003) no. 1, pp.  609-629. http://gdmltest.u-ga.fr/item/1048516530/