On Vertex-Degree-Based Indices of Monogenic Semigroup Graphs
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Abstract
Albertson and the reduced Sombor indices are vertex-degree-based graph invariants that given in [5] and [18], defined as Alb(G)=\sum_{uv\in E(G)}\left|d_{u}-d_{v}\right|, SO_{red}(G)=\sum_{uv\in E(G)}\sqrt{(d_{u}-1)^{2}+(d_{v}-1)^{2}}, respectively. In this work we show that a calculation of Albertson and reduced Sombor index which are vertex-degree-based topological indices, over monogenic semigroup graphs.单基因半群图的基于顶点度的指标
Albertson和约简Sombor指标是基于顶点度的图不变量,由[5]和[18]给出,分别定义为Alb(G)= \sum _uv{\in E(G) }\left |{d_u-}d_v {}\right |, SO_red{(G)}= \sum _uv {\in E(G) }\sqrt{(d_{u}-1)^{2}+(d_{v}-1)^{2}}。在这项工作中,我们展示了单基因半群图上基于顶点度的拓扑指标Albertson和reduced Sombor指数的计算。
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