Average nearest neighbor degrees in scale-free networks

Yao, Dong; Hoorn, Pim van der; Litvak, Nelly

doi:10.24166/im.02.2018

Cited by 11 publications

(4 citation statements)

References 22 publications

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“…For k small, converges to a stable random variable, as was also shown in [45] for k fixed. Thus, for k small, different instances of the erased configuration model show wild fluctuations.…”

Section: Resultssupporting

confidence: 76%

“…For large values of k , this is a rare event, by (3). Indeed, vertices of degree at most are present with high probability in the erased configuration model, whereas the probability that a vertex of degree is present tends to zero in the large network limit [45]. We avoid this problem by averaging over a small range of degrees.…”

Section: Discussionmentioning

confidence: 99%

“…There exists a vast array of papers, empirical, non-rigorous, and rigorous, on a ( k ) [2, 3, 9, 10, 15, 34, 37, 38, 42, 45]. The function describes the correlation between the degrees on the two sides of an edge, and classifies the network into one of the following three categories [35].…”

Section: Introductionmentioning

confidence: 99%

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Degree correlations in scale-free random graph models

Stegehuis

2019

J. Appl. Probab.

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We study the average nearest neighbor degree a(k) of vertices with degree k. In many real-world networks with power-law degree distribution a(k) falls off in k, a property ascribed to the constraint that any two vertices are connected by at most one edge. We show that a(k) indeed decays in k in three simple random graph null models with power-law degrees: the erased configuration model, the rank-1 inhomogeneous random graph and the hyperbolic random graph. We find that in the large-network limit for all three null models a(k) starts to decay beyond n (τ −2)/(τ −1) and then settles on a power law a(k) ∼ k τ −3 , with τ the degree exponent.arXiv:1709.01085v2 [math.PR]

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“…For k small, converges to a stable random variable, as was also shown in [45] for k fixed. Thus, for k small, different instances of the erased configuration model show wild fluctuations.…”

Section: Resultssupporting

confidence: 76%

Section: Discussionmentioning

confidence: 99%

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Degree correlations in scale-free random graph models

Stegehuis

2019

J. Appl. Probab.

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“…Here, n is the maximum degree present in the network and P(h|k) is defined as the conditional probability, for a node of degree k, of being connected to a node of degree h. In general, networks with different correlations P(h|k) may have the same knn (k). Rigorous results about the convergence of the knn (k) function in random graphs with given joint degree distribution of neighbor nodes and in the configuration model have been given by [11].…”

Section: Introductionmentioning

confidence: 99%

Generation of Scale-Free Assortative Networks via Newman Rewiring for Simulation of Diffusion Phenomena

Di Lucchio,

Modanese

2024

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By collecting and expanding several numerical recipes developed in previous work, we implement an object-oriented Python code, based on the networkX library, for the realization of the configuration model and Newman rewiring. The software can be applied to any kind of network and “target” correlations, but it is tested with focus on scale-free networks and assortative correlations. In order to generate the degree sequence we use the method of “random hubs”, which gives networks with minimal fluctuations. For the assortative rewiring we use the simple Vazquez-Weigt matrix as a test in the case of random networks; since it does not appear to be effective in the case of scale-free networks, we subsequently turn to another recipe which generates matrices with decreasing off-diagonal elements. The rewiring procedure is also important at the theoretical level, in order to test which types of statistically acceptable correlations can actually be realized in concrete networks. From the point of view of applications, its main use is in the construction of correlated networks for the solution of dynamical or diffusion processes through an analysis of the evolution of single nodes, i.e., beyond the Heterogeneous Mean Field approximation. As an example, we report on an application to the Bass diffusion model, with calculations of the time tmax of the diffusion peak. The same networks can additionally be exported in environments for agent-based simulations like NetLogo.

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