Extremizing antiregular graphs by modifying total σ-irregularity
Abstract
The total σ-irregularity is given by σt(G) = Σ\u,v\ ⊂eq V(G) (dG(u) - dG(v))2, where dG(z) indicates the degree of a vertex z within the graph G. It is known that the graphs maximizing σt-irregularity are split graphs with only a few distinct degrees. Since one might typically expect that graphs with as many distinct degrees as possible achieve maximum irregularity measures, we modify this invariant to (G)= Σ\u,v\ ⊂eq V(G) |dG(u)-dG(v)|f(n), where n=|V(G)| and f(n)>0. We study under what conditions the above modification obtains its maximum for antiregular graphs. We consider general graphs, trees, and chemical graphs, and accompany our results with a few problems and conjectures.
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