Triangle-Free Penny Graphs: Degeneracy, Choosability, and Edge Count

We show that triangle-free penny graphs have degeneracy at most two, list coloring number (choosability) at most three, diameter $D=\Omega(\sqrt n)$, and at most $\min\bigl(2n-\Omega(\sqrt n),2n-D-2\bigr)$ edges.Comment: 10 pages, 2 figures. To appear at the 25th International Symposium on Graph Drawing and Network Visualization (GD 2017

On choosability with separation of planar graphs with lists of different sizes

A (k,d)(k,d)-list assignment LL of a graph GG is a mapping that assigns to each vertex vv a list L(v)L(v) of at least kk colors and for any adjacent pair xyxy, the lists L(x)L(x) and L(y)L(y) share at most dd colors. A graph GG is (k,d)(k,d)-choosable if there exists an LL-coloring of GG for every (k,d)(k,d)-list assignment LL. This concept is also known as choosability with separation. It is known that planar graphs are (4, 1)-choosable but it is not known if planar graphs are (3, 1)-choosable. We strengthen the result that planar graphs are (4, 1)-choosable by allowing an independent set of vertices to have lists of size 3 instead of 4. Our strengthening is motivated by the observation that in (4, 1)-list assignment, vertices of an edge have together at least 7 colors, while in (3, 1)-list assignment, they have only at least 5. Our setting gives at least 6 colors