Abstract
We introduce and study two natural generalizations of the Connected Vertex Cover (VC) problem: the p-Edge-Connected and p-Vertex-Connected VC problem (where p≥2 is a fixed integer). We obtain an 2 O(pk)n O(1)-time algorithm for p-Edge-Connected VC and an 2 O(k 2) n O(1)-time algorithm for p-Vertex-Connected VC. Thus, like Connected VC, both constrained VC problems are FPT. Furthermore, like Connected VC, neither problem admits a polynomial kernel unless NP ⊆ coNP/poly, which is highly unlikely. We prove however that both problems admit time efficient polynomial sized approximate kernelization schemes. Finally, we describe a 2(p+1)-approximation algorithm for the p-Edge-Connected VC. The proofs for the new VC problems require more sophisticated arguments than for Connected VC. In particular, for the approximation algorithm we use Gomory-Hu trees and for the approximate kernels a result on small-size spanning p-vertex/edge-connected subgraphs of a p-vertex/edge-connected graph by Nishizeki and Poljak (1994) [30] and Nagamochi and Ibaraki (1992) [27].
Original language | English |
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Pages (from-to) | 23-40 |
Number of pages | 18 |
Journal | Journal of Computer and System Sciences |
Volume | 133 |
DOIs | |
Publication status | Published - May 2023 |
Funding
We are grateful to the reviewers for numerous useful suggestions, which led to a significant improvement over our initial presentation.
Keywords
- Approximate kernels
- Approximation algorithms
- Connectivity
- Kernels
- Parameterized algorithms
- Vertex cover