English

Minimum Cost and List Homomorphisms to Semicomplete Digraphs

Discrete Mathematics 2007-05-23 v2

Abstract

The following optimization problem was introduced in \cite{gutinDAM}, where it was motivated by a real-world problem in defence logistics. Suppose we are given a pair of digraphs D,HD,H and a positive cost ci(u)c_i(u) for each uV(D)u\in V(D) and iV(H)i\in V(H). The cost of a homomorphism ff of DD to HH is uV(D)cf(u)(u)\sum_{u\in V(D)}c_{f(u)}(u). For a fixed digraph HH, the minimum cost homomorphism problem for HH, MinHOMP(HH), is stated as follows: For an input digraph DD and costs ci(u)c_i(u) for each uV(D)u\in V(D) and iV(H)i\in V(H), verify whether there is a homomorphism of DD to HH and, if it exists, find such a homomorphism of minimum cost. We obtain dichotomy classifications of the computational complexity of the list homomorphism problem and MinHOMP(HH), when HH is a semicomplete digraph (a digraph in which every two vertices have at least one arc between them). Our dichotomy for the list homomorphism problem coincides with the one obtained by Bang-Jensen, Hell and MacGillivray in 1988 for the homomorphism problem when HH is a semicomplete digraph: both problems are polynomial solvable if HH has at most one cycle; otherwise, both problems are NP-complete. The dichotomy for \MiP is different: the problem is polynomial time solvable if HH is acyclic or HH is a cycle of length 2 or 3; otherwise, the problem is NP-hard.

Keywords

Cite

@article{arxiv.cs/0507017,
  title  = {Minimum Cost and List Homomorphisms to Semicomplete Digraphs},
  author = {G. Gutin and A. Rafiey and A. Yeo},
  journal= {arXiv preprint arXiv:cs/0507017},
  year   = {2007}
}

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8 pages