On the Forcing Domination and the Forcing Total Domination Numbers of a Graph

Abstract

Let G be a connected graph with at least two vertices and S a \(\gamma _{t}\)-set of G. A subset \(T \subseteq S\) is called a forcing subset for S if S is the unique \(\gamma _{t}\)-set containing T. The forcing total domination number of S, denoted by \(f_{\gamma _{t}}(S)\), is the cardinality of a minimum forcing subset of S. The forcing total domination number of G, denoted by \(f_{\gamma _{t}}(G)\) is defined by \(f_{\gamma _{t}}(G)\) = min \(\lbrace f_{\gamma _{t}}(S)\rbrace\), where the minimum is taken over all minimum total dominating sets S in G. Some general properties satisfied by this concepts are studied. The forcing total dominating number of certain standard graphs are determined. It is shown that for every pair a, b of integers with \(0 \le a < b\) and \(b \ge 1\), there exists a connected graph G such that \(f_{\gamma _{t}}(G) = a\) and \(\gamma _{t}(G) = b\), where \(\gamma _{t}(G)\) is total domination number of G. It is also shown that for every pair a,b of integers with \(a \ge 0\) and \(b \ge 0\), there exists a connected graph G such that \(f_{{\gamma }_{t}}(G) = a\) and \(f_{\gamma }(G) = b\), where \(f_{\gamma }(G)\) is the forcing domination number of G.