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Partitioning a graph into degenerate subgraphs

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dc.contributor.author Abu-Khzam, Faisal N.
dc.contributor.author Feghali, Carl
dc.contributor.author Heggernes, Pinar
dc.date.accessioned 2018-04-26T05:58:44Z
dc.date.available 2018-04-26T05:58:44Z
dc.date.copyright 2020 en_US
dc.date.issued 2018-04-26
dc.identifier.uri http://hdl.handle.net/10725/7591
dc.description.abstract Let G = (V, E) be a connected graph with maximum degree k ≥ 3 distinct from Kk+1. Given integers s ≥ 2 and p1, . . . , ps ≥ 0, G is said to be (p1, . . . , ps)-partitionable if there exists a partition of V into sets V1, . . . , Vs such that G[Vi] is pi-degenerate for i ∈ {1, . . . , s}. In this paper, we prove that we can find a (p1, . . . , ps)-partition of G in O(|V| + |E|)-time whenever 1 ≥ p1, . . . , ps ≥ 0 and ∑s i=1 pi ≥ k − s. This generalizes a result of Bonamy et al. (2017) and can be viewed as an algorithmic extension of Brooks’ Theorem and several results on vertex arboricity of graphs of bounded maximum degree. We also prove that deciding whether G is (p, q)-partitionable is NP-complete for every k ≥ 5 and pairs of non-negative integers (p, q) such that (p, q) ̸= (1, 1) and p + q = k − 3. This resolves an open problem of Bonamy et al. (2017). Combined with results of Borodin et al. (2000), Yang and Yuan (2006) and Wu et al. (1996), it also settles the complexity of deciding whether a graph with bounded maximum degree can be partitioned into two subgraphs of prescribed degeneracy en_US
dc.language.iso en en_US
dc.title Partitioning a graph into degenerate subgraphs en_US
dc.type Article en_US
dc.author.school SAS en_US
dc.author.idnumber 200302941 en_US
dc.author.department Computer Science and Mathematics en_US
dc.description.embargo N/A en_US
dc.relation.journal European Journal of Combinatorics en_US
dc.journal.volume 83 en_US
dc.identifier.doi https://doi.org/10.1016/j.ejc.2019.103015 en_US
dc.identifier.ctation Abu-Khzam, F. N., Feghali, C., & Heggernes, P. (2020). Partitioning a graph into degenerate subgraphs. European Journal of Combinatorics, 83, 103015. en_US
dc.author.email faisal.abukhzam@lau.edu.lb en_US
dc.identifier.tou http://libraries.lau.edu.lb/research/laur/terms-of-use/articles.php en_US
dc.identifier.url https://www.sciencedirect.com/science/article/pii/S0195669819301167 en_US
dc.orcid.id https://orcid.org/0000-0001-5221-8421 en_US
dc.author.affiliation Lebanese American University en_US


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