AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable graphs. Bipolarizable and P4-simplicial graphs are recognized in O(n3.376) time, improving the previous bounds of O(n4) and O(n5), respectively. Brittle and semi-simplicial graphs are recognized in O(n3) time using a randomized algorithm, and O(n3log2n) time if a deterministic algorithm is required. The best previous time bound for recognizing these classes of graphs is O(m2). Welsh–Powell opposition graphs are recognized in O(n3) time, improving the previous bound of O(n4). HHP-free graphs and maxibrittle graphs are recognized in O(mn) and O(n3.376) time, respectively
AbstractIn this paper, we consider the recognition problem on a class of perfectly orderable graphs,...
International audienceThis paper deals with the characterization and the recognition of graph classe...
We characterize a new class of perfectly orderable graphs and give a polynomial-time recognition alg...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
Abstract. Hoàng and Reed defined the classes of Raspail (also known as Bipolarizable) and P4-simplic...
The classes of Raspail (also known as Bipolarizable) and P_4-simplicial graphs were introduced by Ho...
The classes of Raspail (also known as Bipolarizable) and P 4-simplicial graphs were introduced b...
AbstractRecently Middendorf and Pfeiffer proved that recognizing perfectly orderable graphs is NP-co...
AbstractThe question whether a polynomial time recognition algorithm for the class of perfectly orde...
AbstractA graph is perfect if the size of the maximum clique equals the chromatic number in every in...
AbstractWe characterize a new class of perfectly orderable graphs and give a polynomial-time recogni...
Abstract. In this paper, we consider the recognition problem on two classes of perfectly orderable g...
In this paper, we consider the recognition problem on three classes of perfectly orderable graphs, n...
SIGLEAvailable from Bibliothek des Instituts fuer Weltwirtschaft, ZBW, Duesternbrook Weg 120, D-2410...
Abstract. We consider the problem of recognizing whether a simple undirected graph is a P4-comparabi...
AbstractIn this paper, we consider the recognition problem on a class of perfectly orderable graphs,...
International audienceThis paper deals with the characterization and the recognition of graph classe...
We characterize a new class of perfectly orderable graphs and give a polynomial-time recognition alg...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
Abstract. Hoàng and Reed defined the classes of Raspail (also known as Bipolarizable) and P4-simplic...
The classes of Raspail (also known as Bipolarizable) and P_4-simplicial graphs were introduced by Ho...
The classes of Raspail (also known as Bipolarizable) and P 4-simplicial graphs were introduced b...
AbstractRecently Middendorf and Pfeiffer proved that recognizing perfectly orderable graphs is NP-co...
AbstractThe question whether a polynomial time recognition algorithm for the class of perfectly orde...
AbstractA graph is perfect if the size of the maximum clique equals the chromatic number in every in...
AbstractWe characterize a new class of perfectly orderable graphs and give a polynomial-time recogni...
Abstract. In this paper, we consider the recognition problem on two classes of perfectly orderable g...
In this paper, we consider the recognition problem on three classes of perfectly orderable graphs, n...
SIGLEAvailable from Bibliothek des Instituts fuer Weltwirtschaft, ZBW, Duesternbrook Weg 120, D-2410...
Abstract. We consider the problem of recognizing whether a simple undirected graph is a P4-comparabi...
AbstractIn this paper, we consider the recognition problem on a class of perfectly orderable graphs,...
International audienceThis paper deals with the characterization and the recognition of graph classe...
We characterize a new class of perfectly orderable graphs and give a polynomial-time recognition alg...