AbstractIn 1981, Chvátal defined the class of perfectly orderable graphs. This class of perfect graphs contains the comparability graphs. In this paper, we introduce a new class of perfectly orderable graphs, the P4-comparability graphs. This class generalizes comparability graphs in a natural way. We also prove a decomposition theorem which leads to a structural characterization of P4-comparability graphs. Using this characterization, we develop a polynomial-time recognition algorithm and polynomial-time algorithms for the clique and colouring problems for P4-comparability graphs
AbstractWe discuss several results concerning on-line algorithms for ordered sets and comparability ...
Abstract. We consider two problems pertaining to P4-comparability graphs, namely, the problem of rec...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...
AbstractThe question whether a polynomial time recognition algorithm for the class of perfectly orde...
AbstractA graph is a P4-comparability graph if it admits an acyclic orientation of its edges which i...
Abstract. We consider the problem of recognizing whether a simple undirected graph is a P4-comparabi...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
AbstractAn undirected graph G is called a comparability graph if there exists an orientation of its ...
We characterize even and odd pairs in comparability and in P4-comparability graphs. The characteriza...
AbstractMa and Spinrad have shown that every transitive orientation of a chordal comparability graph...
AbstractRecently Middendorf and Pfeiffer proved that recognizing perfectly orderable graphs is NP-co...
AbstractThis paper generalizes previous works on perfectly orderable graphs by Olariu (Discrete Math...
A comparability graph is a graph which admits a transitive orientation. In this paper we consider th...
We consider two problems pertaining to P4-comparability graphs, namely, the problem of recognizing w...
AbstractA comparability graph is a graph which admits a transitive orientation. In this paper we con...
AbstractWe discuss several results concerning on-line algorithms for ordered sets and comparability ...
Abstract. We consider two problems pertaining to P4-comparability graphs, namely, the problem of rec...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...
AbstractThe question whether a polynomial time recognition algorithm for the class of perfectly orde...
AbstractA graph is a P4-comparability graph if it admits an acyclic orientation of its edges which i...
Abstract. We consider the problem of recognizing whether a simple undirected graph is a P4-comparabi...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
AbstractAn undirected graph G is called a comparability graph if there exists an orientation of its ...
We characterize even and odd pairs in comparability and in P4-comparability graphs. The characteriza...
AbstractMa and Spinrad have shown that every transitive orientation of a chordal comparability graph...
AbstractRecently Middendorf and Pfeiffer proved that recognizing perfectly orderable graphs is NP-co...
AbstractThis paper generalizes previous works on perfectly orderable graphs by Olariu (Discrete Math...
A comparability graph is a graph which admits a transitive orientation. In this paper we consider th...
We consider two problems pertaining to P4-comparability graphs, namely, the problem of recognizing w...
AbstractA comparability graph is a graph which admits a transitive orientation. In this paper we con...
AbstractWe discuss several results concerning on-line algorithms for ordered sets and comparability ...
Abstract. We consider two problems pertaining to P4-comparability graphs, namely, the problem of rec...
AbstractWe design an O(nm) algorithm to find a minimum weighted colouring and a maximum weighted cli...