Some results on minimum saturated graphs
Abstract
Let G be a graph and F be a family of graphs. We say a graph G is F-saturated if G does not contain any member in F and for any e∈ E(G), G+e creates a copy of some member in F. The saturation number of F is the minimum number of edges of an F-saturated graphs with n vertices, denoted by (n,F). If F=\F\, then we write it as (n,F) for short. In this paper, we determine the exact value of (n,\K3,Pk\), and as its application, we obtain two bounds of (n,K3 Pk) for k 10 and sufficiently large n. Furthermore, (n,K1 F) is determined, where F is a linear forest without isolated vertices.
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