abstract

• A graph is crossing-critical if the removal of any of its edges decreases its crossing number. This work is motivated by the following question: to what extent is crossing-criticality a property that is inherent to the structure of a graph, and to what extent can it be induced on a noncritical graph by multiplying (all or some of) its edges? It is shown that if a nonplanar graph G is obtained by adding an edge to a cubic polyhedral graph, and G is suficiently connected, then G can be made crossing-critical by a suitable multiplication of its edges.

authors

• Beaudou L.
• Hernández Vélez Cesar Israel
• Salazar Anaya Gelasio

publication date

• 2013-01-01

published in

• Electronic Journal of Combinatorics  Journal

Digital Object Identifier (DOI)

• 10.37236/2712

start page

end page

volume

• 20

issue

• 1