Universal Vertices and Saturation Numbers for Disjoint Triangles

Abstract

A graph G is F-saturated if G contains no member of F, but the addition of any non-edge creates a copy of a member of F. For m 1, let (m+1)K3 denote the vertex-disjoint union of (m+1) triangles. In this paper, we study (m+1)K3-saturated graphs. We construct a family of (m+1)K3-saturated graphs which gives the uniform upper bound sat((m+1)K3,n)=O(n3/2) for all m 1 and n 3m+3. For general (m+1)Kp-saturated graphs, Faudree et al. determined sat((m+1)Kp, n) for sufficiently large n. In the case of p=3, we lower Faudree's threshold from n 12m + 3 to n 9m+5 and prove that sat((m+1)K3,n)=n+6m-1. We also provide two structural restrictions on the components obtained after deleting all vertices of degree |V(G)|-1 from an (m+1)K3-saturated graph.