On the Signed Domination Number of the Cartesian Product of Two Directed Cycles

نویسنده

  • Ramy Shaheen
چکیده

Let D be a finite simple directed graph with vertex set V(D) and arc set A(D). A function ( ) { } − : 1,1 f V D → is called a signed dominating function (SDF) if [ ] ( ) 1 D f N v − ≥ for each vertex v V ∈ . The weight ( ) f ω of f is defined by ( ) ∑ v V f v ∈ . The signed domination number of a digraph D is ( ) ( ) { } γ ω = min is an SDF of s D f f D . Let Cm × Cn denotes the cartesian product of directed cycles of length m and n. In this paper, we determine the exact values of γs(Cm × Cn) for m = 8, 9, 10 and arbitrary n. Also, we give the exact value of γs(Cm × Cn) when m, ≡ 0 n (mod 3) and bounds for otherwise.

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تاریخ انتشار 2015