An Improved Integrality Gap for Steiner Tree
Abstract
A promising approach for obtaining improved approximation algorithms for Steiner tree is to use the bidirected cut relaxation (BCR). The integrality gap of this relaxation is at least 36/31, and it has long been conjectured that its true value is very close to this lower bound. However, the best upper bound for general graphs was an almost trivial 2. We improve this bound to 3/2 by a combinatorial algorithm based on the primal-dual schema.
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