Approximating 0,1,2-Survivable Networks with Minimum Number of Steiner Points

Abstract

We consider low connectivity variants of the Survivable Network with Minimum Number of Steiner Points (SN-MSP) problem: given a finite set R of terminals in a metric space (M,d), a subset B ⊂eq R of "unstable" terminals, and connectivity requirements ruv: u,v ∈ R, find a minimum size set S ⊂eq M of additional points such that the unit-disc graph of R S contains ruv pairwise internally edge-disjoint and (B S)-disjoint uv-paths for all u,v ∈ R. The case when ruv=1 for all u,v ∈ R is the Steiner Tree with Minimum Number of Steiner Points (ST-MSP) problem, and the case ruv ∈ \0,1\ is the Steiner Forest with Minimum Number of Steiner Points (SF-MSP) problem. Let be the maximum number of points in a unit ball such that the distance between any two of them is larger than 1. It is known that =5 in R2 The previous known approximation ratio for ST-MSP was (+1)/2 +1+ε in an arbitrary normed space NY, and 2.5+ε in the Euclidean space R2 cheng2008relay. Our approximation ratio for ST-MSP is 1+(-1)+ε in an arbitrary normed space, which in R2 reduces to 1+ 4+ε < 2.3863 +ε. For SN-MSP with ruv ∈ \0,1,2\, we give a simple -approximation algorithm. In particular, for SF-MSP, this improves the previous ratio 2.