English

Irrelevant Vertices for the Planar Disjoint Paths Problem

Combinatorics 2016-06-21 v4 Data Structures and Algorithms

Abstract

The Disjoint Paths Problem asks, given a graph GG and a set of pairs of terminals (s1,t1),,(sk,tk)(s_{1},t_{1}),\ldots,(s_{k},t_{k}), whether there is a collection of kk pairwise vertex-disjoint paths linking sis_{i} and tit_{i}, for i=1,,k.i=1,\ldots,k. In their f(k)n3f(k)\cdot n^{3} algorithm for this problem, Robertson and Seymour introduced the irrelevant vertex technique according to which in every instance of treewidth greater than g(k)g(k) there is an "irrelevant" vertex whose removal creates an equivalent instance of the problem. This fact is based on the celebrated Unique Linkage Theorem, whose - very technical - proof gives a function g(k)g(k) that is responsible for an immense parameter dependence in the running time of the algorithm. In this paper we give a new and self-contained proof of this result that strongly exploits the combinatorial properties of planar graphs and achieves g(k)=O(k3/22k).g(k)=O(k^{3/2}\cdot 2^{k}). Our bound is radically better than the bounds known for general graphs.

Keywords

Cite

@article{arxiv.1310.2378,
  title  = {Irrelevant Vertices for the Planar Disjoint Paths Problem},
  author = {Isolde Adler and Stavros G. Kolliopoulos and Philipp Klaus Krause and Daniel Lokshtanov and Saket Saurabhh and Dimitrios M. Thilikos},
  journal= {arXiv preprint arXiv:1310.2378},
  year   = {2016}
}
R2 v1 2026-06-22T01:43:07.838Z