We study numerically a non-linear integral equation that arises in the study of binary search trees. If the tree is constructed from n elements, this integral equation describes the asymptotic (as n→∞) distribution of the height of the tree. This supplements some asymptotic results we recently obtained for the tails of the distribution. The asymptotic height distribution is shown to be unimodal with highly asymmetric tails
This paper studies path lengths in random binary search trees under the random permutation model. It...
We consider a (random permutation model) binary search tree with n nodes and give asymptotics on the...
This extended abstract is dedicated to the analysis of the height of non-plane unlabelled rooted bin...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
The number of binary trees of fixed size and given height is estimated asymptotically near the peak ...
Abstract. It is shown that all centralized absolute moments E|Hn − EHn | α (α ≥ 0) of the height Hn ...
. The number of descendants of a node in a binary search tree (BST) is the size of the subtree havin...
AbstractDenote by Sn the set of all distinct rooted binary trees with n unlabeled vertices. Define σ...
In this thesis we study the expected height and some other qualities of the binary serach trees. We ...
AbstractBy using analytic tools it is shown that the variance E(Hn−EHn)2 of the height Hn of binary ...
We consider here the probabilistic analysis of the number of descendants and the number of ascendant...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
AbstractThe class ⊤ of binary search trees is studied. A leaf is a vertex of degree 0; ⊤n is the sub...
AbstractWe show that binary search trees of a given size tend to have smaller height when the root d...
A widely used class of binary trees is studied in order to provide information useful in evaluating ...
This paper studies path lengths in random binary search trees under the random permutation model. It...
We consider a (random permutation model) binary search tree with n nodes and give asymptotics on the...
This extended abstract is dedicated to the analysis of the height of non-plane unlabelled rooted bin...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
The number of binary trees of fixed size and given height is estimated asymptotically near the peak ...
Abstract. It is shown that all centralized absolute moments E|Hn − EHn | α (α ≥ 0) of the height Hn ...
. The number of descendants of a node in a binary search tree (BST) is the size of the subtree havin...
AbstractDenote by Sn the set of all distinct rooted binary trees with n unlabeled vertices. Define σ...
In this thesis we study the expected height and some other qualities of the binary serach trees. We ...
AbstractBy using analytic tools it is shown that the variance E(Hn−EHn)2 of the height Hn of binary ...
We consider here the probabilistic analysis of the number of descendants and the number of ascendant...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
AbstractThe class ⊤ of binary search trees is studied. A leaf is a vertex of degree 0; ⊤n is the sub...
AbstractWe show that binary search trees of a given size tend to have smaller height when the root d...
A widely used class of binary trees is studied in order to provide information useful in evaluating ...
This paper studies path lengths in random binary search trees under the random permutation model. It...
We consider a (random permutation model) binary search tree with n nodes and give asymptotics on the...
This extended abstract is dedicated to the analysis of the height of non-plane unlabelled rooted bin...