论文信息 - Discovering Pairwise Compatibility Graphs

Discovering Pairwise Compatibility Graphs

Let T be an edge weighted tree, let dT (u, v) be the sum of the weights of the edges on the path from u to v in T, and let dmin and dmax be two nonnegative real numbers such that dmin ≤ dmax. Then a pairwise compatibility graph of T for dmin and dmax is a graph G = (V,E), where each vertex u′ ∈ V corresponds to a leaf u of T and there is an edge (u′, v′) ∈ E if and only if dmin ≤ dT (u, v) = dmax. A graph G is called a pairwise compatibility graph (PCG) if there exists an edge weighted tree T and two non-negative real numbers dmin and dmax such that G is a pairwise compatibility graph of T for dmin and dmax. Kearney et al. conjectured that every graph is a PCG [3]. In this paper, we refute the conjecture by showing that not all graphs are PCGs. We also show that the well known tree power graphs and some of their extensions are PCGs.

Md. Saidur Rahman | Muhammad Nur Yanhaona | Md. Shamsuzzoha Bayzid | M. S. Rahman | Muhammad N. Yanhaona

[1] Ronald L. Rivest,et al. Introduction to Algorithms , 1990 .

[2] J. Ian Munro,et al. Efficient Generation of Uniform Samples from Phylogenetic Trees , 2003, WABI.

[3] Md. Saidur Rahman,et al. Discovering Pairwise Compatibility Graphs , 2010, Discret. Math. Algorithms Appl..

[4] Clifford Stein,et al. Introduction to Algorithms, 2nd edition. , 2001 .

[5] Panos M. Pardalos,et al. The maximum clique problem , 1994, J. Glob. Optim..

[6] Tao Jiang,et al. Phylogenetic k-Root and Steiner k-Root , 2000, ISAAC.

[7] Md. Saidur Rahman,et al. Pairwise compatibility graphs , 2008, WALCOM.

[8] Thomas H. Cormen,et al. Introduction to algorithms [2nd ed.] , 2001 .

[9] Arthur M. Lesk,et al. Introduction to bioinformatics , 2002 .