New Lower Bounds for the Number of Pseudoline Arrangements

Abstract

Arrangements of lines and pseudolines are fundamental objects in discrete and computational geometry. They also appear in other areas of computer science, such as the study of sorting networks. Let Bn be the number of nonisomorphic arrangements of n pseudolines and let bn=2Bn. The problem of estimating Bn was posed by Knuth in 1992. Knuth conjectured that bn ≤ n 2 + o(n2) and also derived the first upper and lower bounds: bn ≤ 0.7924 (n2 +n) and bn ≥ n2/6 -O(n). The upper bound underwent several improvements, bn ≤ 0.6988\, n2 (Felsner, 1997), and bn ≤ 0.6571\, n2 (Felsner and Valtr, 2011), for large n. Here we show that bn ≥ cn2 -O(n n) for some constant c>0.2083. In particular, bn ≥ 0.2083\, n2 for large n. This improves the previous best lower bound, bn ≥ 0.1887\, n2, due to Felsner and Valtr (2011). Our arguments are elementary and geometric in nature. Further, our constructions are likely to spur new developments and improved lower bounds for related problems, such as in topological graph drawings.