Globally linked pairs and cheapest globally rigid supergraphs

Abstract

Given a graph G, a cost function on the non-edges of G, and an integer d, the problem of finding a cheapest globally rigid supergraph of G in Rd is NP-hard for d≥ 1. For this problem, which is a common generalization of several well-studied graph augmentation problems, no approximation algorithm has previously been known for d≥ 2. Our main algorithmic result is a 5-approximation algorithm in the d=2 case. We achieve this by proving numerous new structural results on rigid graphs and globally linked vertex pairs. In particular, we show that every rigid graph in R2 has a tree-like structure, which conveys all the information regarding its globally rigid augmentations. Our results also yield a new, simple solution to the minimum cardinality version (where the cost function is uniform) for rigid input graphs, a problem which is known to be solvable in polynomial time.