We investigate algorithms for canonical labelling of site graphs, i.e. graphs in which edges bind vertices on sites with locally unique names. We first show that the problem of canonical labelling of site graphs reduces to the problem of canonical labelling of graphs with edge colourings. We then present two canonical labelling algorithms based on edge enumeration, and a third based on an extension of Hopcroft’s partition refinement algorithm. All run in quadratic worst case time individually. However, one of the edge enumeration algorithms runs in sub-quadratic time for graphs with "many " automorphisms, and the partition refinement algorithm runs in sub-quadratic time for graphs with "few " bisimulation equivalences. T...
In SODA 2001, Raghavan and Spinrad introduced robust algorithms as a way to solve hard combinatorial...
AbstractLet G be a graph with vertex set V(G) and edge set E(G), and f be a 0−1 labeling of E(G) so ...
International audienceWe examine the power and limitations of the weakest vertex relabelling system ...
A labelling of a simple graph G = (V,E) is an assignment f of integers to the vertices of G. Under s...
AbstractA good edge-labelling of a graph G is a labelling of its edges such that, for any ordered pa...
AbstractA labelling of a simple graph G=(V,E) is an assignment f of integers to the vertices of G. U...
We hope that the labeling technique presented in the work, gives new insights into isomorphism testi...
A graph labeling is an assignment of integers to the vertices or edges, or both, subject to certain ...
Graph canonization (that solves also the graph isomorphism question) is an old problem that still at...
The graceful labeling problem is a famous open problem in mathematics and computer science, first de...
An assignment of colours to the vertices of a graph is stable if any two vertices of the same colour...
8 pages, 3 figuresInternational audienceA proof labelling scheme for a graph class $\mathcal{C}$ is ...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
Given an undirected graph G, an L(h, k)-labelling of G assigns colors to vertices from the integer s...
We consider the problem of assigning each vertex of a graph G a (short) label such that, for every s...
In SODA 2001, Raghavan and Spinrad introduced robust algorithms as a way to solve hard combinatorial...
AbstractLet G be a graph with vertex set V(G) and edge set E(G), and f be a 0−1 labeling of E(G) so ...
International audienceWe examine the power and limitations of the weakest vertex relabelling system ...
A labelling of a simple graph G = (V,E) is an assignment f of integers to the vertices of G. Under s...
AbstractA good edge-labelling of a graph G is a labelling of its edges such that, for any ordered pa...
AbstractA labelling of a simple graph G=(V,E) is an assignment f of integers to the vertices of G. U...
We hope that the labeling technique presented in the work, gives new insights into isomorphism testi...
A graph labeling is an assignment of integers to the vertices or edges, or both, subject to certain ...
Graph canonization (that solves also the graph isomorphism question) is an old problem that still at...
The graceful labeling problem is a famous open problem in mathematics and computer science, first de...
An assignment of colours to the vertices of a graph is stable if any two vertices of the same colour...
8 pages, 3 figuresInternational audienceA proof labelling scheme for a graph class $\mathcal{C}$ is ...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
Given an undirected graph G, an L(h, k)-labelling of G assigns colors to vertices from the integer s...
We consider the problem of assigning each vertex of a graph G a (short) label such that, for every s...
In SODA 2001, Raghavan and Spinrad introduced robust algorithms as a way to solve hard combinatorial...
AbstractLet G be a graph with vertex set V(G) and edge set E(G), and f be a 0−1 labeling of E(G) so ...
International audienceWe examine the power and limitations of the weakest vertex relabelling system ...