Grounded String Representations of Series-Parallel Graphs without Transitive Edges

Abstract

In a grounded string representation of a graph there is a horizontal line and each vertex is represented as a simple curve below with one end point on such that two curves intersect if and only if the respective vertices are adjacent. A grounded string representation is a grounded L-reverseL-representation if each vertex is represented by a 1-bend orthogonal polyline. It is a grounded L-representation if in addition all curves are L-shaped. We show that every biconnected series-parallel graph without edges between the two vertices of a separation pair (i.e., transitive edges) admits a grounded L-reverseL-representation if and only if it admits a grounded string representation. Moreover, we can test in linear time whether such a representation exists. We also construct a biconnected series-parallel graph without transitive edges that admits a grounded L-reverseL-representation, but no grounded L-representation.

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