Felsner, Hurtado, Noy and Streinu (2000) conjectured that arrangement graphs of simple great-circle arrangements have chromatic number at most $3$. Motivated by this conjecture, we study the colorability of arrangement graphs for different classes of arrangements of (pseudo-)circles. In this paper the conjecture is verified for $\triangle$-saturated pseudocircle arrangements, i.e., for arrangements where one color class of the 2-coloring of faces consists of triangles only, as well as for further classes of (pseudo-)circle arrangements. These results are complemented by a construction which maps $\triangle$-saturated arrangements with a pentagonal face to arrangements with 4-chromatic 4-regular arrangement graphs. This "corona" construction has similarities with the crowning construction introduced by Koester (1985). Based on exhaustive experiments with small arrangements we propose three strengthenings of the original conjecture. We also investigate fractional colorings. It is shown that the arrangement graph of every arrangement $\mathcal{A}$ of pairwise intersecting pseudocircles is "close" to being $3$-colorable. More precisely, the fractional chromatic number $\chi_f(\mathcal{A})$ of the arrangement graph is bounded from above by $\chi_f(\mathcal{A}) \le 3+O(\frac{1}{n})$, where $n$ is the number of pseudocircles of $\mathcal{A}$. Furthermore, we construct an infinite family of $4$-edge-critical $4$-regular planar graphs which are fractionally $3$-colorable. This disproves a conjecture of Gimbel, K\"{u}ndgen, Li, and Thomassen (2019).
翻译: felsner, Hurtado, noy 和 Streinu (2000年) 推测简单大圆圈安排的排列图最多为 $3 美元。 受此推测的驱动, 我们研究不同等级( 假体- ) 圆形( 假体- ) 的排列图的颜色性。 在本文中, 预测图与 Kester (1985年) 引入的加冕结构相似。 在与2色面的一个彩色类别只由三角组成, 以及更多类别的( 假体- ) 圆圈安排。 这些结果由绘制 $3 三角形( 彩色) 的组合图来补充。 K- 彩色( 彩色) 彩色( 彩色) 彩色( 彩色) 美元; 我们还要调查分数的颜色。 这些结果显示, 彩色( 彩色) 彩色) 彩蛋蛋蛋的组合是 美元 。