Graph irregularity and its measures

Abstract Let G be a simple graph. If all vertices of G have equal degrees, then G is said to be regular. Otherwise, G is irregular. There were various attempts to quantify the irregularity of a graph, of which the Collatz–Sinogowitz index, Bell index, Albertson index, and total irregularity are the best known. We now show that no two of these irregularity measures are mutually consistent, namely that for any two such measures, irr X and irr Y there exist pairs of graphs G 1 , G 2 , such that irr X ( G 1 ) >  irr X ( G 2 ) but irr Y ( G 1 )  irr Y ( G 2 ). This implies that the concept of graph irregularity is not free of ambiguities.