Title :
The synthesis of two compatible rooted trees in a rooted supertree by an algorithm on sets
Author_Institution :
Dept. of Comput. Sci., Moncton Univ., NB, Canada
Abstract :
The tree compatibility problem is a problem arising in the theory of computational biology. For a species set S, the problem asks whether τ, a family of trees on S, is compatible, in the sense that there is a single tree T from which each tree of the family can be derived by a sequence of edge contractions. Steel (1992) demonstrated that this problem is NP-complete if τ is a family of unrooted trees. Polynomial time algorithms exist when τ is a finite family of rooted trees. In this paper, we present an algorithm for constructing a rooted tree from a set of constraints on subsets of a set of elements. We then apply this algorithm to synthesize a rooted supertree, compatible with two given rooted trees
Keywords :
biology; computational complexity; trees (mathematics); NP-complete problem; compatible rooted trees; computational biology; constraints; edge contractions; polynomial time algorithms; rooted supertree; sets; subsets; tree compatibility problem; Binary trees; Classification tree analysis; Computational biology; Computer science; History; Phylogeny; Polynomials; Sequences; Steel; Tree graphs;
Conference_Titel :
Computing and Information, 1993. Proceedings ICCI '93., Fifth International Conference on
Conference_Location :
Sudbury, Ont.
Print_ISBN :
0-8186-4212-2
DOI :
10.1109/ICCI.1993.315409
