The average-case analysis of algorithms for binary search trees yields very different results from those obtained under the uniform distribution. The analysis itself is more complex and replaces algebraic equations by integral equations. In this work this analysis is carried out for the computation of the average size of the intersection of two binary trees. The development of this analysis involves Bessel functions that appear in the solutions of partial differential equations, and the result has an average size of $O(n^{2\sqrt 2 - 2} /\sqrt {\log n} )$, contrasting with the size $O(1)$ obtained when considering a uniform distribution
AbstractWe show that binary search trees of a given size tend to have smaller height when the root d...
This paper studies path lengths in random binary search trees under the random permutation model. It...
AbstractWe analyze two bottom-up reduction algorithms over binary trees that represent replaceable d...
The average-case analysis of algorithms for binary search trees yields very different results from t...
In this paper a simple algorithm to test equality of binary trees currently used in symbolic computa...
AbstractWe extend the binary search tree model of probability to simply generated families of trees....
21st International Colloquium, ICALP 94 Jerusalem, Israel, July 11–14, 1994 ProceedingsWe analyze th...
Abstract. For random trees T generated by the binary search tree algorithm from uniformly distribute...
We study numerically a non-linear integral equation that arises in the study of binary search trees....
The limiting distribution of the size of binary interval tree is investigated. Our illustration is b...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
To analyse the demands made on the garbage collector in a graph reduction system, the change in size...
AbstractBinary search trees are one of the most fundamental data structures. While the height of suc...
AbstractWe show that binary search trees of a given size tend to have smaller height when the root d...
This paper studies path lengths in random binary search trees under the random permutation model. It...
AbstractWe analyze two bottom-up reduction algorithms over binary trees that represent replaceable d...
The average-case analysis of algorithms for binary search trees yields very different results from t...
In this paper a simple algorithm to test equality of binary trees currently used in symbolic computa...
AbstractWe extend the binary search tree model of probability to simply generated families of trees....
21st International Colloquium, ICALP 94 Jerusalem, Israel, July 11–14, 1994 ProceedingsWe analyze th...
Abstract. For random trees T generated by the binary search tree algorithm from uniformly distribute...
We study numerically a non-linear integral equation that arises in the study of binary search trees....
The limiting distribution of the size of binary interval tree is investigated. Our illustration is b...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
Binary search trees are one of the most fundamental data structures. While the height of such a tree...
To analyse the demands made on the garbage collector in a graph reduction system, the change in size...
AbstractBinary search trees are one of the most fundamental data structures. While the height of suc...
AbstractWe show that binary search trees of a given size tend to have smaller height when the root d...
This paper studies path lengths in random binary search trees under the random permutation model. It...
AbstractWe analyze two bottom-up reduction algorithms over binary trees that represent replaceable d...