Vertex Cover Reconfiguration and Beyond
In the Vertex Cover Reconfiguration (VCR) problem, given a graph G, positive integers k and ℓ and two vertex covers S and T of G of size at most k, we determine whether S can be transformed into T by a sequence of at most ℓ vertex additions or removals such that every operation results in a vertex c...
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MDPI AG
2018-02-01
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| Series: | Algorithms |
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| Online Access: | http://www.mdpi.com/1999-4893/11/2/20 |
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doaj-edd73c0fba554f25bb8e6f36aad668702020-11-25T01:03:31ZengMDPI AGAlgorithms1999-48932018-02-011122010.3390/a11020020a11020020Vertex Cover Reconfiguration and BeyondAmer E. Mouawad0Naomi Nishimura1Venkatesh Raman2Sebastian Siebertz3Department of Informatics, University of Bergen, PB 7803, N-5020 Bergen, NorwaySchool of Computer Science, University of Waterloo, Waterloo, ON N2L 3G1, CanadaInstitute of Mathematical Sciences, Chennai 600113, IndiaInstitute of Informatics, University of Warsaw, 02-097 Warsaw, PolandIn the Vertex Cover Reconfiguration (VCR) problem, given a graph G, positive integers k and ℓ and two vertex covers S and T of G of size at most k, we determine whether S can be transformed into T by a sequence of at most ℓ vertex additions or removals such that every operation results in a vertex cover of size at most k. Motivated by results establishing the W [ 1 ] -hardness of VCR when parameterized by ℓ, we delineate the complexity of the problem restricted to various graph classes. In particular, we show that VCR remains W [ 1 ] -hard on bipartite graphs, is NP -hard, but fixed-parameter tractable on (regular) graphs of bounded degree and more generally on nowhere dense graphs and is solvable in polynomial time on trees and (with some additional restrictions) on cactus graphs.http://www.mdpi.com/1999-4893/11/2/20reconfigurationvertex coversolution spacefixed-parameter tractabilitybipartite graphs |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Amer E. Mouawad Naomi Nishimura Venkatesh Raman Sebastian Siebertz |
| spellingShingle |
Amer E. Mouawad Naomi Nishimura Venkatesh Raman Sebastian Siebertz Vertex Cover Reconfiguration and Beyond Algorithms reconfiguration vertex cover solution space fixed-parameter tractability bipartite graphs |
| author_facet |
Amer E. Mouawad Naomi Nishimura Venkatesh Raman Sebastian Siebertz |
| author_sort |
Amer E. Mouawad |
| title |
Vertex Cover Reconfiguration and Beyond |
| title_short |
Vertex Cover Reconfiguration and Beyond |
| title_full |
Vertex Cover Reconfiguration and Beyond |
| title_fullStr |
Vertex Cover Reconfiguration and Beyond |
| title_full_unstemmed |
Vertex Cover Reconfiguration and Beyond |
| title_sort |
vertex cover reconfiguration and beyond |
| publisher |
MDPI AG |
| series |
Algorithms |
| issn |
1999-4893 |
| publishDate |
2018-02-01 |
| description |
In the Vertex Cover Reconfiguration (VCR) problem, given a graph G, positive integers k and ℓ and two vertex covers S and T of G of size at most k, we determine whether S can be transformed into T by a sequence of at most ℓ vertex additions or removals such that every operation results in a vertex cover of size at most k. Motivated by results establishing the W [ 1 ] -hardness of VCR when parameterized by ℓ, we delineate the complexity of the problem restricted to various graph classes. In particular, we show that VCR remains W [ 1 ] -hard on bipartite graphs, is NP -hard, but fixed-parameter tractable on (regular) graphs of bounded degree and more generally on nowhere dense graphs and is solvable in polynomial time on trees and (with some additional restrictions) on cactus graphs. |
| topic |
reconfiguration vertex cover solution space fixed-parameter tractability bipartite graphs |
| url |
http://www.mdpi.com/1999-4893/11/2/20 |
| work_keys_str_mv |
AT ameremouawad vertexcoverreconfigurationandbeyond AT naominishimura vertexcoverreconfigurationandbeyond AT venkateshraman vertexcoverreconfigurationandbeyond AT sebastiansiebertz vertexcoverreconfigurationandbeyond |
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