Abstract
In this paper, we study two generalizations of Vertex Cover and Edge Cover, namely Colorful Vertex Cover and Colorful Edge Cover. In the Colorful Vertex Cover problem, given an n-vertex edge-colored graph G with colors from { 1 , … , ω} and coverage requirements r1, r2, … , rω , the goal is to find a minimum-sized set of vertices that are incident on at least ri edges of color i, for each 1 ≤ i≤ ω , i.e., we need to cover at least ri edges of color i. Colorful Edge Cover is similar to Colorful Vertex Cover, except here we are given a vertex-colored graph and the goal is to cover at least ri vertices of color i, for each 1 ≤ i≤ ω , by a minimum-sized set of edges. These problems have several applications in fair covering and hitting of geometric set systems involving points and lines that are divided into multiple groups. Here, “fairness” ensures that the coverage (resp. hitting) requirement of every group is fully satisfied. We obtain a (2 + ϵ) -approximation for the Colorful Vertex Cover problem in time nO(ω/ϵ) . Thus, for a constant number of colors, the problem admits a (2 + ϵ) -approximation in polynomial time. Next, for the Colorful Edge Cover problem, we design an O(ωn3) time exact algorithm, via a chain of reductions to a matching problem. For all intermediate problems in this chain of reductions, we design polynomial-time algorithms, which might be of independent interest.
Original language | English |
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Pages (from-to) | 3816-3827 |
Number of pages | 12 |
Journal | Algorithmica |
Volume | 85 |
Issue number | 12 |
DOIs | |
State | Published - 1 Dec 2023 |
Externally published | Yes |
ASJC Scopus subject areas
- General Computer Science
- Computer Science Applications
- Applied Mathematics