Add to ORKGThe tree matching problem is considered of given labeled trees P and T, determining if the pattern tree P can be obtained from the text tree T by deleting degree-one and degree-two nodes and, in the case of unordered trees, by also permuting siblings. The constrained tree inclusion problem is more sensitive to the structure of the pattern tree than the general tree inclusion problem. Further, it can be solved in polynomial time for both unordered and ordered trees. Algorithms based on the subtree homeomorphism algorithm of (Chung, 1987) are presented that solve the constrained tree inclusion problem in O(m1.5n) time on unordered trees with m and n nodes, and in O(mn) time on ordered trees, using O(mn) additional space. These algorithms can ...
AbstractWe study approximate matching between h-ary trees (ordered trees whose nodes have exactly h ...
We present an efficient algorithm that decides the consistency of partial descriptions of ordered t...
For a set of rooted, unordered, distinctly leaf-labeled trees, the NP-hard maximum agreement subtree...
The tree matching problem is considered of given labeled trees P and T, determining if the pattern ...
AbstractThe tree matching problem is considered of given labeled trees P and T, determining if the p...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
The tree inclusion problem is, given two node-labeled trees P and T (the "pattern tree" and the "tex...
www.elsevier.com/locate/ipl We consider the following tree-matching problem: Given labeled, ordered ...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
We consider the following problem: Given ordered labeled trees S and T can S be obtained from T by d...
Given two trees (a target $T$ and a pattern $P$) and a natural number $w$, {\em window embedded subt...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
Given two undirected trees T and P, the Subtree Homeomorphism Problem is to find whether T has a sub...
In this paper, we show an O(n+m) time Turing reduction from the tree pattern matching problem to ano...
In this paper, we show an O (n+m) time Turing reduction from the tree pattern matching problem to an...
AbstractWe study approximate matching between h-ary trees (ordered trees whose nodes have exactly h ...
We present an efficient algorithm that decides the consistency of partial descriptions of ordered t...
For a set of rooted, unordered, distinctly leaf-labeled trees, the NP-hard maximum agreement subtree...
The tree matching problem is considered of given labeled trees P and T, determining if the pattern ...
AbstractThe tree matching problem is considered of given labeled trees P and T, determining if the p...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
The tree inclusion problem is, given two node-labeled trees P and T (the "pattern tree" and the "tex...
www.elsevier.com/locate/ipl We consider the following tree-matching problem: Given labeled, ordered ...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
We consider the following problem: Given ordered labeled trees S and T can S be obtained from T by d...
Given two trees (a target $T$ and a pattern $P$) and a natural number $w$, {\em window embedded subt...
Given two rooted, ordered, and labeled trees P and T the tree inclusion problem is to determine if P...
Given two undirected trees T and P, the Subtree Homeomorphism Problem is to find whether T has a sub...
In this paper, we show an O(n+m) time Turing reduction from the tree pattern matching problem to ano...
In this paper, we show an O (n+m) time Turing reduction from the tree pattern matching problem to an...
AbstractWe study approximate matching between h-ary trees (ordered trees whose nodes have exactly h ...
We present an efficient algorithm that decides the consistency of partial descriptions of ordered t...
For a set of rooted, unordered, distinctly leaf-labeled trees, the NP-hard maximum agreement subtree...