Abstract
We consider a path packing problem: given a supply graph G with a node-set N and a demand graph ( T, S) with T⊆ N, find the maximal number of edge-disjoint paths in G whose end-pairs belong to S; the network ( G, T) is assumed to be Eulerian. Karzanov’s condition on cliques of the complementary graph (T, S) (Polyhedra related to undirected multicommodity flows, Linear Algebra and its Applications 114/115 (1989) 293) appreciably restricts the class of such problems. The excluded cases are all known to be NP-hard, while the retained problems, except those related to the cut condition, are still open. The paper presents a max–min theorem for the easiest of these problems, with (T, S) isomorphic to K 2, r , r>2. The method implements an approach of “smooth relaxation” implicitly developed in prior research in the area. The proof is nonconstructive; the algorithmic aspect of the problem is still open.
Published Version
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