Extremal problems on saturation for the family of k-edge-connected graphs

Abstract

Let F be a family of graphs. A graph G is F-saturated if G contains no member of F as a subgraph but G+e contains some member of F whenever e∈ E(G). The saturation number and extremal number of F, denoted sat(n,F) and ex(n,F) respectively, are the minimum and maximum numbers of edges among n-vertex F-saturated graphs. For k∈N, let Fk and F'k be the families of k-connected and k-edge-connected graphs, respectively. Wenger proved sat(n,Fk)=(k-1)n-k2, we prove sat(n,F'k)=(k-1)(n-1)- nk+1k-1 2. We also prove ex(n,F'k)=(k-1)n-k2 and characterize when equality holds. Finally, we give a lower bound on the spectral radius for Fk-saturated and F'k-saturated graphs.