Grunnleggende konsepter
This paper proposes efficient approximation algorithms for the Total Dominating Set (TDS) and Total Roman Dominating Set (TRDS) problems in unit disk graphs.
Sammendrag
The paper focuses on the Total Dominating Set (TDS) and Total Roman Dominating Set (TRDS) problems in unit disk graphs (UDGs).
Key highlights:
- The authors prove that the TRDS problem is NP-complete in UDGs.
- They propose a 7.17-factor approximation algorithm for the TDS problem in UDGs, with a running time of O(n log k), where n is the number of vertices and k is the size of the independent set.
- They also propose a 6.03-factor approximation algorithm for the TRDS problem in UDGs, with the same time complexity.
- The algorithms use a greedy set cover approach as a subroutine to efficiently find the total dominating set and total Roman dominating set.
- The authors provide detailed analysis and proofs to establish the approximation factors and time complexities of the proposed algorithms.
Statistikk
|V(G)| = n
|D| ≤ 44/9 * |D*|
|V2| ≤ 44/9 * |D*|
W(f) ≤ 2171/360 * W(f*)
Sitater
"The TRDS problem is NP-complete in unit disk graphs (UDGs)."
"The proposed algorithm (TDS-UDG-SC) gives a 7.17 -factor approximation result for the TDS problem in UDGs."
"The proposed algorithm (TRDF-UDG-SC) gives a 6.03 - factor approximation result for the TRDF problem in UDGs."