Non-regular graphs with minimal total irregularity

Abstract

The total irregularity of a simple undirected graph G is defined as irrt(G) = 12Σu,v ∈ V(G) | dG(u)-dG(v) |, where dG(u) denotes the degree of a vertex u ∈ V(G). Obviously, irrt(G)=0 if and only if G is regular. Here, we characterize the non-regular graphs with minimal total irregularity and thereby resolve the recent conjecture by Zhu, You and Yang~zyy-mtig-2014 about the lower bound on the minimal total irregularity of non-regular connected graphs. We show that the conjectured lower bound of 2n-4 is attained only if non-regular connected graphs of even order are considered, while the sharp lower bound of n-1 is attained by graphs of odd order. We also characterize the non-regular graphs with the second and the third smallest total irregularity.