Arrangements of Approaching Pseudo-Lines

Abstract

We consider arrangements of n pseudo-lines in the Euclidean plane where each pseudo-line i is represented by a bi-infinite connected x-monotone curve fi(x), x ∈ R, s.t.\ for any two pseudo-lines i and j with i < j, the function x fj(x) - fi(x) is monotonically decreasing and surjective (i.e., the pseudo-lines approach each other until they cross, and then move away from each other). We show that such arrangements of approaching pseudo-lines, under some aspects, behave similar to arrangements of lines, while for other aspects, they share the freedom of general pseudo-line arrangements. For the former, we prove: 1. There are arrangements of pseudo-lines that are not realizable with approaching pseudo-lines. 2. Every arrangement of approaching pseudo-lines has a dual generalized configuration of points with an underlying arrangement of approaching pseudo-lines. For the latter, we show: 1. There are 2(n2) isomorphism classes of arrangements of approaching pseudo-lines (while there are only 2(n n) isomorphism classes of line arrangements). 2. It can be decided in polynomial time whether an allowable sequence is realizable by an arrangement of approaching pseudo-lines. Furthermore, arrangements of approaching pseudo-lines can be transformed into each other by flipping triangular cells, i.e., they have a connected flip graph, and every bichromatic arrangement of this type contains a bichromatic triangular cell.