增殖树度、距离和古特曼指数

IF 0.6 Q3 MATHEMATICS Transactions on Combinatorics Pub Date : 2016-06-01 DOI:10.22108/TOC.2016.9915

R. Kazemi, Leila Khaleghi Meimondari

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引用次数: 3

摘要

连通图$G$的Gutman索引和度距离定义为:$ begin{eqnarray*}} $ $ textrm{Gut}(G)=sum_{{u,v}subseteq v (G)}d(u)d(v)d_G(u,v)}(d(u)+d(v))和$ $ begin{eqnarray*}和$ $ begin{eqnarray*} _ (G)=sum_{{u,v}subseteq v (G)}(d(u)+d(v))d_G(u,v)}， $ end{eqnarray*}}，其中$ $d(u)$是顶点$u$的度，$d_G(u,v)$是顶点$u$和$v$ $之间的距离。本文通过维纳指数的递推方程，研究了古特曼指数的前两个矩和递增树的度距离。

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DEGREE DISTANCE AND GUTMAN INDEX OF INCREASING TREES

‎‎The Gutman index and degree distance of a connected graph $G$ are defined as‎ ‎begin{eqnarray*}‎ ‎textrm{Gut}(G)=sum_{{u,v}subseteq V(G)}d(u)d(v)d_G(u,v)‎, ‎end{eqnarray*}‎ ‎and‎ ‎begin{eqnarray*}‎ ‎DD(G)=sum_{{u,v}subseteq V(G)}(d(u)+d(v))d_G(u,v)‎, ‎end{eqnarray*}‎ ‎respectively‎, ‎where‎ ‎$d(u)$ is the degree of vertex $u$ and $d_G(u,v)$ is the distance between vertices $u$ and $v$‎. ‎In this paper‎, ‎through a recurrence equation for the Wiener index‎, ‎we study the first two‎ ‎moments of the Gutman index and degree distance of increasing‎ ‎trees‎.

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