Secure domination in P5-free graphs
Abstract
A dominating set of a graph G is a set S ⊂eq V(G) such that every vertex in V(G) S has a neighbor in S, where two vertices are neighbors if they are adjacent. A secure dominating set of G is a dominating set S of G with the additional property that for every vertex v ∈ V(G) S, there exists a neighbor u of v in S such that (S \u\) \v\ is a dominating set of G. The secure domination number of G, denoted by γs(G), is the minimum cardinality of a secure dominating set of G. We prove that if G is a P5-free graph, then γs(G) 32α(G), where α(G) denotes the independence number of G. We further show that if G is a connected (P5, H)-free graph for some H ∈ \ P3 P1, K2 2K1, ~paw,~ C4\, then γs(G) \3,α(G)\. We also show that if G is a (P3 P2)-free graph, then γs(G) α(G)+1.
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