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Locally Constrained Homomorphisms on Graphs of Bounded Treewidth and Bounded Degree

A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its restriction to the neighborhood of every vertex of G is bijective, surjective, or injective, respectively. We prove that the problems of testing whether a given graph G allows a homomorphism to a given graph H that is locally bijective, surjective, or injective, respectively, are NP-complete, even when G has pathwidth at most 5, 4, or 2, respectively, or when both G and H have maximum degree 3. We complement these hardness results by showing that the three problems are polynomial-time solvable if G has bounded treewidth and in addition G or H has bounded maximum degree.

preprint2014arXivOpen access
Steven ChaplickJiří FialaPim van 't HofDaniël PaulusmaMarek Tesař
math.COComputational ComplexityDiscrete Mathematics
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Steven ChaplickJiří FialaPim van 't HofDaniël PaulusmaMarek Tesař

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