A PTAS for Weak Minimum Routing Cost Connected Dominating Set of Unit Disk Graph

Considering the virtual backbone problem of wireless sensor networks with the shortest path constraint, the problem can be modeled as finding a minimum routing cost connected dominating set (MOC-CDS) in the graph. In this chapter, we study a variation of the MOC-CDS problem. Let k be a fixed positive integer. For any two vertices u, v of G and a vertex subset $$S \subseteq V (G)$$ , denote ℓ S (u, v) the length of the shortest (u, v)-path in G all whose intermediate vertices are in S and define $$g(u,v) = \left \{\begin{array}{@{}l@{\quad }l@{}} d(u,v) + 4, \quad &\mbox{ if }d(u,v) \leq k + 1; \\ (1 + \frac{4} {k})d(u,v) + 6,\quad &\mbox{ if }d(u,v) > k + 1. \end{array} \right.$$ The g-MOC-CDS problem asks for a subset S with the minimum cardinality such that S is a connected dominating set of G and $${\mathcal{l}}_{S}(u,v) \leq g(u,v)$$ for any pair of vertices (u, v) of G. Clearly, g-MOC-CDS can serve as a virtual backbone of the network such that the routing cost is not increased too much. In this chapter, we give a PTAS for the g-MOC-CDS problem on unit disk graphs.