Improved Inapproximability Results for Steiner Tree via Long Code Based Reductions

Abstract

The best algorithm for approximating Steiner tree has performance ratio (4)+ε ≈ 1.386 [J. Byrka et al., Proceedings of the 42th Annual ACM Symposium on Theory of Computing (STOC), 2010, pp. 583-592], whereas the inapproximability result stays at the factor 9695 ≈ 1.0105 [M. Chleb\'ik and J. Chleb\'ikov\'a, Proceedings of the 8th Scandinavian Workshop on Algorithm Theory (SWAT), 2002, pp. 170-179]. In this article, we take a step forward to bridge this gap and show that there is no polynomial time algorithm approximating Steiner tree with constant ratio better than 1918 ≈ 1.0555 unless P = NP. We also relate the problem to the Unique Games Conjecture by showing that it is UG-hard to find a constant approximation ratio better than 1716 = 1.0625. In the special case of quasi-bipartite graphs, we prove an inapproximability factor of 2524 ≈ 1.0416 unless P = NP, which improves upon the previous bound of 128127 ≈ 1.0078. The reductions that we present for all the cases are of the same spirit with appropriate modifications. Our main technical contribution is an adaptation of a Set-Cover type reduction in which the Long Code is used to the geometric setting of the problems we consider.