AbstractWe further refine the bounds on the path length of binary trees of a given size by considering not only their sizes, but also their heights and fringe thicknesses (the difference between the length of their shortest root-to-leaf paths and their heights). We characterize the maximum-path-length binary trees of a given height, size, and fringe thickness, and using this characterization, we give an algorithm to find the maximum-path-length binary trees of a given size and fringe thickness. The proof of the main result is based on two new tree transformations that preserve the height, size, and fringe thickness
We consider extended binary trees and study the common right and left depth of leaf $j$, where the l...
A fundamental problem in network science is the normalization of the topological or physical distanc...
An improved upper bound is obtained on the averaged path length of an alphabetical binary tree (or e...
AbstractWe show how to compute the maximum path length of binary trees with a given size and a given...
AbstractWe further refine the bounds on the path length of binary trees of a given size by consideri...
We solve the following problem: Characterize the minimum-path-length binary trees with respect to si...
AbstractIn this paper we continue the study of the path length of trees with known fringe as initiat...
We introduce and investigate the approximability of the maximum binary tree problem (MBT) in directe...
AbstractThis paper characterizes binary trees with n leaves, which have the greatest number of subtr...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
The weighted path length of optimum binary search trees is bounded above by $\sum \beta_i + 2\sum \...
AbstractWe prove that the internal path length of an AVL tree of size N is bounded from above by 1.4...
Problems in circuit fan-out reduction motivate the study of constructing various types of weighted t...
A buttoning of a tree that has vertices v1,v2,...,vn is a closed walk that starts at v1 and travels ...
This paper studies path lengths in random binary search trees under the random permutation model. It...
We consider extended binary trees and study the common right and left depth of leaf $j$, where the l...
A fundamental problem in network science is the normalization of the topological or physical distanc...
An improved upper bound is obtained on the averaged path length of an alphabetical binary tree (or e...
AbstractWe show how to compute the maximum path length of binary trees with a given size and a given...
AbstractWe further refine the bounds on the path length of binary trees of a given size by consideri...
We solve the following problem: Characterize the minimum-path-length binary trees with respect to si...
AbstractIn this paper we continue the study of the path length of trees with known fringe as initiat...
We introduce and investigate the approximability of the maximum binary tree problem (MBT) in directe...
AbstractThis paper characterizes binary trees with n leaves, which have the greatest number of subtr...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
The weighted path length of optimum binary search trees is bounded above by $\sum \beta_i + 2\sum \...
AbstractWe prove that the internal path length of an AVL tree of size N is bounded from above by 1.4...
Problems in circuit fan-out reduction motivate the study of constructing various types of weighted t...
A buttoning of a tree that has vertices v1,v2,...,vn is a closed walk that starts at v1 and travels ...
This paper studies path lengths in random binary search trees under the random permutation model. It...
We consider extended binary trees and study the common right and left depth of leaf $j$, where the l...
A fundamental problem in network science is the normalization of the topological or physical distanc...
An improved upper bound is obtained on the averaged path length of an alphabetical binary tree (or e...