Edge Intersection Graphs of L-Shaped Paths in Grids

Abstract

In this paper we continue the study of the edge intersection graphs of one (or zero) bend paths on a rectangular grid. That is, the edge intersection graphs where each vertex is represented by one of the following shapes: ,, , , and we consider zero bend paths (i.e., | and -) to be degenerate . These graphs, called B1-EPG graphs, were first introduced by Golumbic et al (2009). We consider the natural subclasses of B1-EPG formed by the subsets of the four single bend shapes (i.e., , ,, ,, and ,,) and we denote the classes by [], [,], [,], and [,,] respectively. Note: all other subsets are isomorphic to these up to 90 degree rotation. We show that testing for membership in each of these classes is NP-complete and observe the expected strict inclusions and incomparability (i.e., [] ⊂neq [,], [,] ⊂neq [,,] ⊂neq B1-EPG; also, [,] is incomparable with [,]). Additionally, we give characterizations and polytime recognition algorithms for special subclasses of Split [].