Independence and Connectivity of Connected Domination Critical Graphs

Abstract

A graph G is said to be k-γc-critical if the connected domination number γc(G) = k and γc(G + uv) < k for every uv ∈ E(G). Let δ, and α be respectively the minimum degree, the connectivity and the independence number. In this paper, we show that a 3-γc-critical graph G satisfies α ≤ + 2. Moreover, if ≥ 3, then α = + p if and only if α = δ + p for all p ∈ \1, 2\. We show that the condition + 1 ≤ α ≤ + 2 is best possible to prove that = δ. By these result, we conclude our paper with an open problem on Hamiltonian connected of 3-γc-critical graphs.