The Evaluation of the Number and the Entropy of Spanning Trees on Generalized Small-World Networks

Enumerating all the spanning trees of a complex network is theoretical defiance for mathematicians, electrical engineers and computer scientists. In this article, we propose a generalization of the Fractal Scale-Free Lattice and we study its structural properties. As its degree distribution follows a power law, we prove that the proposed generalization does not affect the scale-free property. In addition, we use the electrically equivalent transformations to count the number of spanning trees in the generalized Fractal Scale-Free Lattice. Finally, in order to evaluate the robustness of the generalized lattice, we compute and compare its entropy with other complex networks having the same average degree.

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The Evaluation of the Number and the Entropy of Spanning Trees on Generalized Small-World Networks

Cited by 3 publications

References 25 publications

Assessment of the Effectiveness of Random and Real-Networks Based on the Asymptotic Entropy

Assessment of the Effectiveness of Random and Real-Networks Based on the Asymptotic Entropy

Correct proof of the main result in “The number of spanning trees of a class of self-similar fractal models” by Ma and Yao

The structural properties and the spanning trees entropy of the generalized Fractal Scale-Free Lattice

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