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On generalized atom-bond connectivity index of cacti
2019Summary: The generalized atom-bond connectivity index of a graph \(G\) is denoted by ABC\(_a(G)\) and defined as the sum of weights \(\left(\frac{d(u)+d(v)-2}{d(u)d(v)}\right)^\alpha\) over all edges \(uv \in G\), where \(d(u)\) is the degree of the vertex \(u\) in \(G\), and \(\alpha\) is an arbitrary non-zero real number. A cactus is a graph in which
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Extremal values of the atom-bond sum-connectivity index in bicyclic graphs
Journal of Applied Mathematics and Computing, 2023Suresh E
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Atom–bond connectivity index of trees
Discrete Applied Mathematics, 2009Boris Furtula, Damir Vukicevic
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Further results on atom-bond connectivity index of trees
Discrete Applied Mathematics, 2010Bo Zhou, Zhibin Du
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The first multiplication atom-bond connectivity index of molecular structures in drugs
Saudi Pharmaceutical Journal, 2017wei gao, Yiqiao Wang, Weifan Wang
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On atom–bond connectivity index of connected graphs
Discrete Applied Mathematics, 2011Bo Zhou, Fengming Dong
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Maximum atom-bond connectivity index with given graph parameters
Discrete Applied Mathematics, 2016Xiao-dong Zhang
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On structural properties of trees with minimal atom-bond connectivity index
Discrete Applied Mathematics, 2014Darko Dimitrov
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