Integrality Gap of the Hypergraphic Relaxation of Steiner Trees: a short proof of a 1.55 upper bound

David Pritchard; Deeparnab Chakrabarty; Jochen Koenemann

arxiv: 1006.2249 · v1 · submitted 2010-06-11 · 💻 cs.DM · math.CO

Integrality Gap of the Hypergraphic Relaxation of Steiner Trees: a short proof of a 1.55 upper bound

Deeparnab Chakrabarty , Jochen Koenemann , David Pritchard This is my paper

classification 💻 cs.DM math.CO

keywords integralityboundproofrelaxationsteineralgorithmapplyingapproximation

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Recently Byrka, Grandoni, Rothvoss and Sanita (at STOC 2010) gave a 1.39-approximation for the Steiner tree problem, using a hypergraph-based linear programming relaxation. They also upper-bounded its integrality gap by 1.55. We describe a shorter proof of the same integrality gap bound, by applying some of their techniques to a randomized loss-contracting algorithm.

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Integrality Gap of the Hypergraphic Relaxation of Steiner Trees: a short proof of a 1.55 upper bound

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