Akbar Ali, Emina Milovanović, Stefan Stankov, Marjan Matejić, Igor Milovanović
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引用次数: 0
摘要
让 G 是一个简单图,其顶点集为(V={v_{1},v_{2},\ldots ,v_{n}\})。\(i\sim j\) 这个概念用来表示 G 的顶点 \(v_{i}\) 和 \(v_{j}\) 是相邻的。对于顶点 \(v_{i}\in V\), 让 \(d_{i}\) 是 \(v_{i}\) 的度数。G 的谐波算术(HA)指数定义为:\(HA(G) =\sum _{i\sim j} 4d_id_j(d_i+d_j)^{-2}\).本文推导了大量涉及 HA 指数和其他拓扑指数的不等式。对于每一个求得的不等式,所有满足相等情况的图形也都被表征出来。
Inequalities involving the harmonic-arithmetic index
Let G be a simple graph with vertex set \(V=\{v_{1},v_{2},\ldots ,v_{n}\}\). The notion \(i\sim j\) is used to indicate that the vertices \(v_{i}\) and \(v_{j}\) of G are adjacent. For a vertex \(v_{i}\in V\), let \(d_{i}\) be the degree of \(v_{i}\). The harmonic-arithmetic (HA) index of G is defined as \(HA(G) =\sum _{i\sim j} 4d_id_j(d_i+d_j)^{-2}\). In this paper, a considerable number of inequalities involving the HA index and other topological indices are derived. For every obtained inequality, all the graphs that satisfy the equality case are also characterized.
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