4.6 Article

NETWORK COHERENCE ANALYSIS ON A FAMILY OF NESTED WEIGHTED n-POLYGON NETWORKS

相关参考文献

注意:仅列出部分参考文献,下载原文获取全部文献信息。
Article Physics, Multidisciplinary

Exact calculations of network coherence in weighted ring-trees networks and recursive trees

Ting Jing et al.

Summary: This paper investigates noisy consensus dynamics in two specific families of weighted ring-trees networks and recursive trees. It demonstrates the significance of weights in consensus behaviors and scalings, showing that ring-trees networks are more conducive to consensus compared to trees.

PHYSICA SCRIPTA (2021)

Article Computer Science, Information Systems

Coherence analysis and Laplacian energy of recursive trees with controlled initial states

Mei-du Hong et al.

FRONTIERS OF INFORMATION TECHNOLOGY & ELECTRONIC ENGINEERING (2020)

Article Mathematics, Applied

On energy and Laplacian energy of chain graphs

Kinkar Chandra Das et al.

DISCRETE APPLIED MATHEMATICS (2020)

Article Mathematics, Applied

Coherence analysis of a class of weighted networks

Meifeng Dai et al.

Article Mathematics, Interdisciplinary Applications

Network coherence and eigentime identity on a family of weighted fractal networks

Yue Zong et al.

CHAOS SOLITONS & FRACTALS (2018)

Article Computer Science, Interdisciplinary Applications

Determining entire mean first-passage time for Cayley networks

Xiaoqian Wang et al.

INTERNATIONAL JOURNAL OF MODERN PHYSICS C (2018)

Article Mathematics, Applied

On common noise-induced synchronization in complex networks with state-dependent noise diffusion processes

Giovanni Russo et al.

PHYSICA D-NONLINEAR PHENOMENA (2018)

Article Physics, Applied

The entire mean weighted first-passage time on infinite families of weighted tree networks

Yanqiu Sun et al.

MODERN PHYSICS LETTERS B (2017)

Article Mathematics, Interdisciplinary Applications

SCALING OF THE AVERAGE RECEIVING TIME ON A FAMILY OF WEIGHTED HIERARCHICAL NETWORKS

Yu Sun et al.

FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN NATURE AND SOCIETY (2016)

Article Computer Science, Artificial Intelligence

Applications of Laplacian spectra for n-prism networks

Jia-Bao Liu et al.

NEUROCOMPUTING (2016)

Article Mathematics, Applied

Network coherence in the web graphs

Qingyan Ding et al.

COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2015)

Article Computer Science, Hardware & Architecture

Small-World Topology Can Significantly Improve the Performance of Noisy Consensus in a Complex Network

Yuhao Yi et al.

COMPUTER JOURNAL (2015)

Article Mathematics, Applied

ON THE LAPLACIAN SPECTRA OF PRODUCT GRAPHS

S. Barik et al.

APPLICABLE ANALYSIS AND DISCRETE MATHEMATICS (2015)

Article Mathematics, Applied

Random walks on non-homogenous weighted Koch networks

Meifeng Dai et al.

Article Physics, Multidisciplinary

Scaling of average receiving time and average weighted shortest path on weighted Koch networks

Meifeng Dai et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2012)

Article Mathematics, Applied

Resistance distances and the Kirchhoff index in Cayley graphs

Xing Gao et al.

DISCRETE APPLIED MATHEMATICS (2011)

Article Mathematics, Applied

Effective graph resistance

W. Ellens et al.

LINEAR ALGEBRA AND ITS APPLICATIONS (2011)

Article Physics, Multidisciplinary

Clustering coefficient and community structure of bipartite networks

Peng Zhang et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2008)

Article Mathematics, Applied

Laplacian energy of a graph

I Gutman et al.

LINEAR ALGEBRA AND ITS APPLICATIONS (2006)

Article Physics, Fluids & Plasmas

Average path length in random networks

A Fronczak et al.

PHYSICAL REVIEW E (2004)

Article Physics, Fluids & Plasmas

Spectra of complex networks

SN Dorogovtsev et al.

PHYSICAL REVIEW E (2003)

Review Physics, Condensed Matter

Evolution of networks

SN Dorogovtsev et al.

ADVANCES IN PHYSICS (2002)

Article Physics, Fluids & Plasmas

Spectra and eigenvectors of scale-free networks

KI Goh et al.

PHYSICAL REVIEW E (2001)

Article Physics, Multidisciplinary

Deterministic scale-free networks

AL Barabási et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2001)

Article Physics, Fluids & Plasmas

Spectra of real-world graphs:: Beyond the semicircle law -: art. no. 026704

IJ Farkas et al.

PHYSICAL REVIEW E (2001)

Review Multidisciplinary Sciences

Exploring complex networks

SH Strogatz

NATURE (2001)

Article Computer Science, Information Systems

Deterministic small-world communication networks

F Comellas et al.

INFORMATION PROCESSING LETTERS (2000)