A first view on the density of 5-planar graphs

$k$-planar graphs are generalizations of planar graphs that can be drawn in the plane with at most $k > 0$ crossings per edge. One of the central research questions of $k$-planarity is the maximum edge density, i.e., the maximum number of edges a $k$-planar graph on $n$ vertices may have. While there are numerous results for the classes of general $k$-planar graphs for $k\leq 2$, there are only very few results for increasing $k=3$ or $4$ due to the complexity of the classes. We make a first step towards even larger $k>4$ by exploring the class of $5$-planar graphs. While our main tool is still the discharging technique, a better understanding of the structure of the denser parts leads to corresponding density bounds in a much simpler way. We first apply a simplified version of our technique to outer $5$-planar graphs and use the resulting density bound to assert that the structure of maximally dense $5$-planar graphs differs from the uniform structure when $k$ is small. As the central result of this paper, we then show that simple $5$-planar graphs have at most $\frac{340}{49}(n-2) \approx 6.94(n-2)$ edges, which is a drastic improvement from the previous best bound of $\approx8.3n$. This even implies a small improvement of the leading constant in the Crossing Lemma $cr(G) \ge c \frac{m^3}{n^2}$ from $c=\frac{1}{27.48}$ to $c=\frac{1}{27.19}$. To demonstrate the potential of our new technique, we also apply it to other graph classes, such as 4-planar and 6-planar graphs.