The limiting distribution of the normalized number of comparisons used by Quicksort to sort an array of n numbers is known to be the unique fixed point with zero mean of a certain distributional transformation S. We study the convergence to the limiting distribution of the sequence of distributions obtained by iterating the transformation S, beginning with a (nearly) arbitrary starting distribution. We demonstrate geometrically fast convergence for various metrics and discuss some implications for numerical calculations of the limiting Quicksort distribution. Finally, we give companion lower bounds which show that the convergence is not faster than geometric
AbstractWe investigate the number of swaps made by Quick Select (a variant of Quick Sort for finding...
We characterize all limit laws of the quicksort type random variables defined recursively by Xn = X ...
In this paper we study the number of key exchanges required by Hoare’s FIND algorithm (also called Q...
The number of comparisons Xn used by Quicksort to sort an array of n distinct numbers has mean µn of...
Most previous studies of the sorting algorithm QuickSort have used the number of key comparisons as ...
The limiting distribution µ of the normalized number of key comparisons required by the Quicksort so...
In a continuous-time setting, Fill (2012) proved, for a large class of probabilistic sources, that t...
AbstractThe first complete running time analysis of a stochastic divide and conquer algorithm was gi...
We provide a smoothed analysis of Hoare's find algorithm, and we revisit the smoothed analysis of qu...
In this dissertation, we study in depth the limiting distribution of the costs of running the random...
We give asymptotics for the left and right tails of the limiting Quicksort distribution. The results...
Quicksort may be the most familiar and important randomised algorithm studied in computer science. I...
Cette thèse est consacrée à l'analyse de plusieurs problèmes issus de l'informatique et de la combin...
The worst-case complexity of an implementation of Quicksort depends on the random number generator t...
Abstract. We give asymptotics for the left and right tails of the lim-iting Quicksort distribution. ...
AbstractWe investigate the number of swaps made by Quick Select (a variant of Quick Sort for finding...
We characterize all limit laws of the quicksort type random variables defined recursively by Xn = X ...
In this paper we study the number of key exchanges required by Hoare’s FIND algorithm (also called Q...
The number of comparisons Xn used by Quicksort to sort an array of n distinct numbers has mean µn of...
Most previous studies of the sorting algorithm QuickSort have used the number of key comparisons as ...
The limiting distribution µ of the normalized number of key comparisons required by the Quicksort so...
In a continuous-time setting, Fill (2012) proved, for a large class of probabilistic sources, that t...
AbstractThe first complete running time analysis of a stochastic divide and conquer algorithm was gi...
We provide a smoothed analysis of Hoare's find algorithm, and we revisit the smoothed analysis of qu...
In this dissertation, we study in depth the limiting distribution of the costs of running the random...
We give asymptotics for the left and right tails of the limiting Quicksort distribution. The results...
Quicksort may be the most familiar and important randomised algorithm studied in computer science. I...
Cette thèse est consacrée à l'analyse de plusieurs problèmes issus de l'informatique et de la combin...
The worst-case complexity of an implementation of Quicksort depends on the random number generator t...
Abstract. We give asymptotics for the left and right tails of the lim-iting Quicksort distribution. ...
AbstractWe investigate the number of swaps made by Quick Select (a variant of Quick Sort for finding...
We characterize all limit laws of the quicksort type random variables defined recursively by Xn = X ...
In this paper we study the number of key exchanges required by Hoare’s FIND algorithm (also called Q...