We provide a general method to prove the existence and compute efficiently elimination orderings in graphs. Our method relies on several tools that were known before, but that were not put together so far: the algorithm LexBFS due to Rose, Tarjan and Lueker, one of its properties discovered by Berry and Bordat, and a local decomposition property of graphs discovered by Maffray, Trotignon and Vušković
AbstractAn important property of chordal graphs is that these graphs are characterized by the existe...
AbstractWe consider the family of graph problems called node-deletion problems, defined as follows; ...
A graph class is hereditary if it is closed under vertex deletion. We give examples of NP-hard, PSPA...
AMS Classification: 05C75 We provide a general method to prove the existence and compute efficiently...
AbstractFor an undirected graph G the kth power Gk of G is the graph with the same vertex set as G w...
We prepared this book as a course textbook for our students in Taiwan. Our aim was to write a book a...
When minimum orderings proved too difficult to deal with, Rose, Tarjan, and Leuker instead studied m...
AbstractThis paper studies properties of perfect elimination orderings in chordal graphs. Specific c...
This thesis consists of three parts devoted to graph labeling, hereditary graph classes, and paramet...
AbstractFor an undirected graph G the kth power Gk of G is the graph with the same vertex set as G w...
We introduce a new class of structured symmetric matrices by extending the notion of perfect elimina...
We introduce a new class of structured symmetric matrices by extending the notion of perfect elimina...
under exclusive licence to Springer Science+Business Media, LLC, part of Springer Nature.For a famil...
Vertex elimination is a graph operation that turns the neighborhood of a vertex into a clique and re...
Vertex elimination is a graph operation that turns the neighborhood of a vertex into a clique and re...
AbstractAn important property of chordal graphs is that these graphs are characterized by the existe...
AbstractWe consider the family of graph problems called node-deletion problems, defined as follows; ...
A graph class is hereditary if it is closed under vertex deletion. We give examples of NP-hard, PSPA...
AMS Classification: 05C75 We provide a general method to prove the existence and compute efficiently...
AbstractFor an undirected graph G the kth power Gk of G is the graph with the same vertex set as G w...
We prepared this book as a course textbook for our students in Taiwan. Our aim was to write a book a...
When minimum orderings proved too difficult to deal with, Rose, Tarjan, and Leuker instead studied m...
AbstractThis paper studies properties of perfect elimination orderings in chordal graphs. Specific c...
This thesis consists of three parts devoted to graph labeling, hereditary graph classes, and paramet...
AbstractFor an undirected graph G the kth power Gk of G is the graph with the same vertex set as G w...
We introduce a new class of structured symmetric matrices by extending the notion of perfect elimina...
We introduce a new class of structured symmetric matrices by extending the notion of perfect elimina...
under exclusive licence to Springer Science+Business Media, LLC, part of Springer Nature.For a famil...
Vertex elimination is a graph operation that turns the neighborhood of a vertex into a clique and re...
Vertex elimination is a graph operation that turns the neighborhood of a vertex into a clique and re...
AbstractAn important property of chordal graphs is that these graphs are characterized by the existe...
AbstractWe consider the family of graph problems called node-deletion problems, defined as follows; ...
A graph class is hereditary if it is closed under vertex deletion. We give examples of NP-hard, PSPA...