On Degree Properties of Crossing-Critical Families of Graphs

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Authors

BOKAL Drago BRACIC Mojca DERŇÁR Marek HLINĚNÝ Petr

Year of publication 2019
Type Article in Periodical
Magazine / Source Electronic Journal of Combinatorics
MU Faculty or unit

Faculty of Informatics

Citation
web https://www.combinatorics.org/ojs/index.php/eljc/article/view/v26i1p53/7812
Doi http://dx.doi.org/10.37236/7753
Keywords graph theory; crossing number; crossing-critical
Description Answering an open question from 2007, we construct infinite k-crossing-critical families of graphs that contain vertices of any prescribed odd degree, for any sufficiently large k. To answer this question, we introduce several properties of infinite families of graphs and operations on the families allowing us to obtain new families preserving those properties. This conceptual setup allows us to answer general questions on behaviour of degrees in crossing-critical graphs: we show that, for any set of integers D such that min(D) >= 3 and 3, 4 is an element of D, and for any sufficiently large k, there exists a k-crossing-critical family such that the numbers in D are precisely the vertex degrees that occur arbitrarily often in (large enough) graphs of this family. Furthermore, even if both D and some average degree in the interval (3, 6) are prescribed, k-crossing-critical families exist for any sufficiently large k.
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