6533b839fe1ef96bd12a6391

RESEARCH PRODUCT

Effect of Topological Structure and Coupling Strength in Weighted Multiplex Networks

Hocine CherifiRajesh KumarAnurag Singh

subject

PhysicsMatrix (mathematics)Work (thermodynamics)Algebraic connectivityStructure (category theory)MultiplexTopologyEigenvalues and eigenvectorsHeterogeneous networkClustering coefficient

description

Algebraic connectivity (second smallest eigenvalue of the supra-Laplacian matrix of the underlying multilayer network) and inter-layer coupling strength play an important role in the diffusion processes on the multiplex networks. In this work, we study the effect of inter-layer coupling strength, topological structure on algebraic connectivity in weighted multiplex networks. The results show a remarkable transition in the value of algebraic connectivity from classical cases where the inter-layer coupling strength is homogeneous. We investigate various topological structures in multiplex networks using configuration model, the Barabasi-Albert model (BA) and empirical data-set of multiplex networks. The threshold value \(d_c^{'}\) is found smaller in heterogeneous networks for all the multiplex networks as compared to the homogeneous case. Experimental results reveal that the topological structure (average clustering coefficient) and inter-layer coupling strength has considerable effect on threshold values for the algebraic connectivity.

yearjournalcountryeditionlanguage
2018-01-01
https://doi.org/10.1007/978-3-030-04648-4_33