(Faster) Multi-Sided Boundary Labelling

Abstract

A 1-bend boundary labelling problem consists of an axis-aligned rectangle B, n points (called sites) in the interior, and n points (called ports) on the labels along the boundary of B. The goal is to find a set of n axis-aligned curves (called leaders), each having at most one bend and connecting one site to one port, such that the leaders are pairwise disjoint. A 1-bend boundary labelling problem is k-sided (1≤ k≤ 4) if the ports appear on k different sides of B. Kindermann et al. ["Multi-Sided Boundary Labeling", Algorithmica, 76(1): 225-258, 2016] showed that the 1-bend three-sided and four-sided boundary labelling problems can be solved in O(n4) and O(n9) time, respectively. Bose et al. [SWAT, 12:1-12:14, 2018] improved the latter running time to O(n6) by reducing the problem to computing maximum independent set in an outerstring graph. In this paper, we improve both previous results by giving new algorithms with running times O(n3 n) and O(n5) to solve the 1-bend three-sided and four-sided boundary labelling problems, respectively.