English

Approximation Algorithms for Generalized MST and TSP in Grid Clusters

Discrete Mathematics 2015-07-17 v1 Computational Geometry Data Structures and Algorithms

Abstract

We consider a special case of the generalized minimum spanning tree problem (GMST) and the generalized travelling salesman problem (GTSP) where we are given a set of points inside the integer grid (in Euclidean plane) where each grid cell is 1×11 \times 1. In the MST version of the problem, the goal is to find a minimum tree that contains exactly one point from each non-empty grid cell (cluster). Similarly, in the TSP version of the problem, the goal is to find a minimum weight cycle containing one point from each non-empty grid cell. We give a (1+42+ϵ)(1+4\sqrt{2}+\epsilon) and (1.5+82+ϵ)(1.5+8\sqrt{2}+\epsilon)-approximation algorithm for these two problems in the described setting, respectively. Our motivation is based on the problem posed in [7] for a constant approximation algorithm. The authors designed a PTAS for the more special case of the GMST where non-empty cells are connected end dense enough. However, their algorithm heavily relies on this connectivity restriction and is unpractical. Our results develop the topic further.

Keywords

Cite

@article{arxiv.1507.04438,
  title  = {Approximation Algorithms for Generalized MST and TSP in Grid Clusters},
  author = {Binay Bhattacharya and Ante Ćustić and Akbar Rafiey and Arash Rafiey and Vladyslav Sokol},
  journal= {arXiv preprint arXiv:1507.04438},
  year   = {2015}
}
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