Fan-crossing free graphs and their relationship to other beyond-planar graphs.

A graph is fan-crossing free if it has a drawing in the plane so that each edge is crossed by independent edges, that is the crossing edges have distinct vertices. On the other hand, it is fan-crossing if the crossing edges have a common vertex, so that they form a fan. Both are prominent examples for beyond-planar graphs. Further well-known beyond-planar classes are the k -planar, k -gap-planar, quasi-planar, and right angle crossing graphs. We use the subdivision, node-to-circle expansion and path-addition operations to distinguish all these graph classes. In particular, we show that the 2-subdivision and the node-to-circle expansion of any graph is fan-crossing free, which does not hold for fan-crossing and k -(gap)-planar graphs, respectively. Thereby, we obtain graphs that are fan-crossing free and neither fan-crossing nor k -(gap)-planar. Finally, we show that some graphs have a unique fan-crossing free embedding, that there are thinned maximal fan-crossing free graphs, and that the recognition problem for fan-crossing free graphs is NP-complete. [ABSTRACT FROM AUTHOR]