On the Decision Number of Graphs

Abstract

Let G be a graph. A good function is a function f:V(G)→ \-1,1\, satisfying f(N(v))≥ 1, for each v∈ V(G), where N(v)=\u∈ V(G)\, |\, uv∈ E(G) \ and f(S) = Σu∈ S f(u) for every S ⊂eq V(G) . For every cubic graph G of order n, we prove that γ(G) ≤ 5n7 and show that this inequality is sharp. A function f:V(G)→ \-1,1\ is called a nice function, if f(N[v])1, for each v∈ V(G), where N[v]=\v\ N(v) . Define β(G)=max\f(V(G))\, where f is a nice function for G. We show that β(G) -3n7 for every cubic graph G of order n, which improves the best known bound -n2.