On Degree Properties of Crossing-critical Families of Graphs

• Authors: BOKAL Drago; BRAČIČ Mojca; DERŇÁR Marek; HLINĚNÝ Petr
• Year of publication: 2015
• Type: Article in Proceedings
• Conference: Graph Drawing and Network Visualization 2015, Lecture Notes in Computer Science 9411
• MU Faculty or unit: Faculty of Informatics
• Doi: https://doi.org/10.1007/978-3-319-27261-0_7
• Field: Informatics
• Keywords: Crossing number; Tile drawing; Degree-universality; Average degree; Crossing-critical graph
• Description: Answering an open question from 2007, we construct infinite k-crossing-critical families of graphs which contain vertices of any prescribed odd degree, for sufficiently large k. From this we derive that, for any set of integers D such that min(D)>=3 and 3,4eD, and for all sufficiently large k there exists a k-crossing-critical family such that the numbers in D are precisely the vertex degrees which occur arbitrarily often in any large enough graph in this family. We also investigate what are the possible average degrees of such crossing-critical families.

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