English

Approximation Algorithm for Minimum Weight $(k,m)$-CDS Problem in Unit Disk Graph

Discrete Mathematics 2019-01-07 v2 Data Structures and Algorithms

Abstract

In a wireless sensor network, the virtual backbone plays an important role. Due to accidental damage or energy depletion, it is desirable that the virtual backbone is fault-tolerant. A fault-tolerant virtual backbone can be modeled as a kk-connected mm-fold dominating set ((k,m)(k,m)-CDS for short). In this paper, we present a constant approximation algorithm for the minimum weight (k,m)(k,m)-CDS problem in unit disk graphs under the assumption that kk and mm are two fixed constants with mkm\geq k. Prior to this work, constant approximation algorithms are known for k=1k=1 with weight and 2k32\leq k\leq 3 without weight. Our result is the first constant approximation algorithm for the (k,m)(k,m)-CDS problem with general k,mk,m and with weight. The performance ratio is (α+2.5kρ)(\alpha+2.5k\rho) for k3k\geq 3 and (α+2.5ρ)(\alpha+2.5\rho) for k=2k=2, where α\alpha is the performance ratio for the minimum weight mm-fold dominating set problem and ρ\rho is the performance ratio for the subset kk-connected subgraph problem (both problems are known to have constant performance ratios.)

Keywords

Cite

@article{arxiv.1508.05515,
  title  = {Approximation Algorithm for Minimum Weight $(k,m)$-CDS Problem in Unit Disk Graph},
  author = {Yishuo Shi and Zhao Zhang and Ding-Zhu Du},
  journal= {arXiv preprint arXiv:1508.05515},
  year   = {2019}
}
R2 v1 2026-06-22T10:39:26.677Z