The clustered selected-internal Steiner tree problem

Abstract

Given a complete graph G=(V,E), with nonnegative edge costs, two subsets R ⊂ V and R ⊂ R, a partition R=\R1,R2,…,Rk\ of R, Ri Rj=φ, i ≠ j and R=\R1,R2,…,Rk\ of R, Ri ⊂ Ri, a clustered Steiner tree is a tree T of G that spans all vertices in R such that T can be cut into k subtrees Ti by removing k-1 edges and each subtree Ti spanning all vertices in Ri, 1 ≤ i ≤ k. The cost of a clustered Steiner tree is defined to be the sum of the costs of all its edges. A clustered selected-internal Steiner tree of G is a clustered Steiner tree for R if all vertices in Ri are internal vertices of Ti, 1 ≤ i ≤ k. The clustered selected-internal Steiner tree problem is concerned with the determination of a clustered selected-internal Steiner tree T for R and R in G with minimum cost. In this paper, we present the first known approximation algorithm with performance ratio (+4) for the clustered selected-internal Steiner tree problem, where is the best-known performance ratio for the Steiner tree problem.