Penny graph

By arranging the pennies in a square grid, or in the form of certain squaregraphs, one can form triangle-free penny graphs whose number of edges is at least

and in any triangle-free penny graph the number of edges is at most^[10]Swanepoel conjectured that the ${\displaystyle \left\lfloor 2n-2{\sqrt {n}}\right\rfloor }$ bound is tight.^[11] Proving this, or finding a better bound, remains open.

Coloring

Every penny graph contains a vertex with at most three neighbors. For instance, such a vertex can be found at one of the corners of the convex hull of the circle centers. Therefore, penny graphs have degeneracy at most three. Based on this, one can prove that their graph colorings require at most four colors, much more easily than the proof of the more general four-color theorem.^[12] However, despite their restricted structure, there exist penny graphs that do still require four colors.^[13]

Analogously, the degeneracy of every triangle-free penny graph is at most two. Every such graph contains a vertex with at most two neighbors, even though it is not always possible to find this vertex on the convex hull. Based on this, one can prove that they require at most three colors, more easily than the proof of the more general Grötzsch's theorem that triangle-free planar graphs are 3-colorable.^[10]

Independent sets

A maximum independent set in a penny graph is a subset of the pennies, no two of which touch each other. Finding maximum independent sets is NP-hard for arbitrary graphs, and remains NP-hard on penny graphs.^[2] It is an instance of the maximum disjoint set problem, in which one must find large subsets of non-overlapping regions of the plane. However, as with planar graphs more generally, Baker's technique provides a polynomial-time approximation scheme for this problem.^[14]

What is the largest ${\displaystyle c}$ such that every ${\displaystyle n}$ -vertex penny graph has an independent set of size ${\displaystyle cn}$ ?