1995
DOI: 10.1006/jctb.1995.1006
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Graph Minors .XIII. The Disjoint Paths Problem

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Cited by 1,054 publications
(944 citation statements)
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“…Actually, Robertson and Seymour in [108] describe an O k (n 3 )-step algorithm that solves a generalization of the H-Minor Checking and another celebrated problem, namely the k-Disjoint Paths problem. In Section 5, we give a rough description of the main ingredients of the algorithm in Theorem 2 especially for the k-Disjoint Paths problem.…”
Section: Theorem 2 (Robertson and Seymour[108]) One Can Construct Anmentioning
confidence: 99%
See 2 more Smart Citations
“…Actually, Robertson and Seymour in [108] describe an O k (n 3 )-step algorithm that solves a generalization of the H-Minor Checking and another celebrated problem, namely the k-Disjoint Paths problem. In Section 5, we give a rough description of the main ingredients of the algorithm in Theorem 2 especially for the k-Disjoint Paths problem.…”
Section: Theorem 2 (Robertson and Seymour[108]) One Can Construct Anmentioning
confidence: 99%
“…The bad news is that, according to the algorithm in [108] and the proof of its correctness in [111] and [107], the values of this function are immense 4 involving r 2's. Clearly, such type of constants may create reasonable doubts to computer scientists on whether such an algorithm may be considered to be an "algorithm" of some practical meaning.…”
Section: Theorem 2 (Robertson and Seymour[108]) One Can Construct Anmentioning
confidence: 99%
See 1 more Smart Citation
“…Observe that, in a general (di)graph, the problem of deciding whether there exist edge-disjoint paths between given pairs of vertices is NP-complete [Kar75] (even if the graph is a square grid [Kv82]). When the number of pairs of vertices is bounded by a constant, the disjoint paths problem is polynomial in undirected graphs [RS95], NP-complete in directed graphs [LR80] (even with only two pairs of vertices [FHW80]), and polynomial in symmetric directed graphs [JP09].…”
Section: Background and Motivationmentioning
confidence: 99%
“…Once an embedding in a k-tree is given for a graph, many combinatorial problems can be solved in time linear in the size of the graph [2-4, 6, 9, 11, 17, 18, 19, 35] (the constant of proportionality depends however on the value of k). An O(nz ) approximate embedding algorithm was developed by Robertson and Seymour [30,31]. Various improvements are possible (see e.g., Courcelle [17], Lagergren [25], and Bodlaender [12,13].…”
Section: Introductionmentioning
confidence: 99%