Regular matroids have polynomial extension complexity
Abstract
We prove that the extension complexity of the independence polytope of every regular matroid on n elements is O(n6). Past results of Wong and Martin on extended formulations of the spanning tree polytope of a graph imply a O(n2) bound for the special case of (co)graphic matroids. However, the case of a general regular matroid was open, despite recent attempts. We also consider the extension complexity of circuit dominants of regular matroids, for which we give a O(n2) bound.
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