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《山东大学学报(理学版)》 ›› 2023, Vol. 58 ›› Issue (11): 165-174.doi: 10.6040/j.issn.1671-9352.0.2022.062

•   • 上一篇    

一类图的广义特征多项式

王冉冉(),文飞*(),张树成   

  1. 兰州交通大学应用数学研究所, 甘肃 兰州 730070
  • 收稿日期:2022-01-19 出版日期:2023-11-20 发布日期:2023-11-07
  • 通讯作者: 文飞 E-mail:wangrr2028@163.com;wenfei@lzjtu.edu.cn
  • 作者简介:王冉冉(1999—), 女, 硕士研究生, 研究方向为图谱理论. E-mail: wangrr2028@163.com
  • 基金资助:
    国家自然科学基金资助项目(11961041);国家自然科学基金资助项目(12261055);甘肃省自然科学基金(21JR11RA065)

On the generalized characteristic polynomial of a family of graphs

Ranran WANG(),Fei WEN*(),Shucheng ZHANG   

  1. Institute of Applied Mathematics, Lanzhou Jiaotong University, Lanzhou 730070, Gansu, China
  • Received:2022-01-19 Online:2023-11-20 Published:2023-11-07
  • Contact: Fei WEN E-mail:wangrr2028@163.com;wenfei@lzjtu.edu.cn

摘要:

首先定义了一类新图——类似门槛图, 然后结合算法设计得到了这类图的广义特征多项式(即Φ-谱), 从而推出了一类门槛图的Φ-特征多项式及其谱。作为应用, 还构造了一些Φ-同谱无穷类。

关键词: 门槛图, 广义特征多项式, Φ-同谱

Abstract:

Firstly, a class of graphs called thresholdlike graphs is defined. Then, combined with algorithm, the generalized characteristic polynomial (i.e., Φ-spectrum) of such graphs is obtained. The Φ-characteristic polynomial and its spectrum of a class of threshold graphs are derived. As an application, some infinite classes of Φ-cospectra have also been constructed.

Key words: threshold graph, generalized characteristic polynomial, Φ-cospectral

中图分类号: 

  • O157.5

图1

构造图例"

表1

当m=1, 2, 3, 4时的ΦΓ(λ, t)"

m ΦΓ(λ, t)
1 $(\lambda+t)^2-1$
2 $\lambda^4+8 t \lambda^3+\left(23 t^2-4\right) \lambda^2+2\left(14 t^3-7 t-1\right) \lambda+(t-1)(2 t+1)\left(6 t^2+3 t-1\right)$
3 $\lambda^6+18 t \lambda^5+\left(130 t^2-9\right) \lambda^4+2\left(240 t^3-49 t-5\right) \lambda^3+\left(949 t^4-376 t^2-68 t+3\right) \lambda^2+2\left(471 \times t^5-297 t^3-68 t^2+12 t+2\right) \lambda$
$+(t-1)(3 t+1)\left(120 t^4+80 t^3-13 t^2-8 t+1\right)$
4 $\lambda^8+32 t \lambda^7+2\left(217 t^2-8\right) \lambda^6+4\left(812t^3-89t-7\right) \lambda^5+\left(14 609t^4-3 154 t^2-464t+2\right) \lambda^4+2\left(20 104t^5-7 073t^3-1 436t^2+49t+12\right) \lambda^3$
$+2\left(32 798 t^6-16 782 t^4-4 097 t^3+399 t^2+119 t+1\right) \lambda^2+2\left(28 656 t^7-19 710 t^5+2\left(28 656 t^7-19 710 t^5-5 297 t^4+1 072 t^3\right.\right.$
$\left.+332 t^2-10 t-3\right) \lambda+(t-1)(4 t+1)\left(5 040 t^6+3 780 t^5-392 t^4-483 t^3+5 t^2+15 t-1\right)$

图2

图G0和H0"

图3

图Gi和Hi(i=1, 2, 3)"

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