Let G = (V, E) be a simple, undirected and connected graph. A connected dominating set S ? V is a secure connected dominating set of G, if for each u ∈ V S, there exists v ∈ S such that (u, v) ∈ E and the set (S {v}) ∪ {u} is a connected dominating set of G. The minimum size of a secure connected dominating set of G denoted by γsc(G), is called the secure connected domination number of G. Given a graph G and a positive integer k, the Secure Connected Domination (SCDM) problem is to check whether G has a secure connected dominating set of size at most k. In this paper, we prove that the SCDM problem is NP-complete for doubly chordal graphs, a subclass of chordal graphs. We investigate the complexity of this problem for some subclasses of bipartite graphs namely, star convex bipartite, comb convex bipartite, chordal bipartite and chain graphs. The Minimum Secure Connected Dominating Set (MSCDS) problem is to find a secure connected dominating set of minimum size in the input graph. We propose a ( (G)+1)-approximation algorithm for MSCDS, where (G) is the maximum degree of the input graph G and prove that MSCDS cannot be approximated within (1 ? ?) ln(|V |) for any ? > 0 unless NP ? DT IME |V |O(log log |V |)) even for bipartite graphs. Finally, we show that the MSCDS is APX-complete for graphs with Δ(G) = 4.
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机译:设G =(v,e)是一个简单,无向和连接的图形。连接的主导集合s? v是一个安全的连接主导集G,如果为每个U≠V s,则存在V≠S这样的(U,V)∈e和集合(s {v})∪{u}是连接的主导的G。由γSC(g)表示的安全连接的主导G组的最小尺寸被称为G的安全连接的统治数量。给定图G和正整数K,安全连接的统治(SCDM)问题是检查G是否具有最多k的安全连接的主导大小集。在本文中,我们证明了SCDM问题对于双重十字图来说是NP-Comblal,这是十曲图的子类。我们研究了二分层的一些亚类的这个问题的复杂性即,星形凸二分,梳凸双子,曲线二分和链条图。最小安全连接的主导集(MSCD)问题是在输入图中找到一组安全的连接主导大小。我们提出了一种((g)+1)-mscds的估计算法,其中(g)是输入图G的最大程度,并证明MSCD不能近似(1?)LN(| V |)还> 0除非NP? dt ime | v | o(log log | v |))即使是双面图。最后,我们表明MSCD为具有Δ(g)= 4的图形的APX完成。
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