Role of dimensionality in complex networks

Brito, Samuraí; Silva, L. R. da; Tsallis, Constantino

doi:10.1038/srep27992

Cited by 50 publications

(59 citation statements)

References 49 publications

(49 reference statements)

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“…In 2016, we studied a d-dimensional network model where the interactions are short-or long-ranged depending on the choice of the parameter α A ≥ 0. The results that were obtained reinforced the connection between nonextensive statistical mechanics and the networks theory [13]. In that work, we found some quantities which present a universal behaviour with respect to the particular variable α A /d and observed the existence of three regimes.…”

Section: Introductionsupporting

confidence: 83%

“…where r ≥ 1 is the Euclidean distance from the newly arrived site to the center of mass of the pre-existing system. For more details see [13]. This network is characterized by three parameters α A , α G and d, where α A controls the importance of the distance in the preferential attachment rule, α G is associated with the geographical distribution of the sites, and d is the dimension of the system.…”

Section: Introductionmentioning

confidence: 99%

“…We have analyzed the exponent β, which is associated with the time evolution of the connectivity of sites, the average shortest path l , the degree distribution entropy S q and the average clustering coefficient C . Along the lines of [13], in order to analyse these properties, we choose the typical value α G = 2 and vary the parameters (α A , d).…”

Section: Introductionmentioning

confidence: 99%

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Scaling properties of d -dimensional complex networks

et al. 2019

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The area of networks is very interdisciplinary and exhibits many applications in several fields of science. Nevertheless, there are few studies focusing on geographically located d-dimensional networks. In this paper, we study scaling properties of a wide class of d-dimensional geographically located networks which grow with preferential attachment involving Euclidean distances through r −α A ij (αA ≥ 0). We have numerically analyzed the time evolution of the connectivity of sites, the average shortest path, the degree distribution entropy, and the average clustering coefficient, for d = 1, 2, 3, 4, and typical values of αA. Remarkably enough, virtually all the curves can be made to collapse as functions of the scaled variable αA/d. These observations confirm the existence of three regimes. The first one occurs in the interval αA/d ∈ [0, 1]; it is non-Boltzmannian with verylong-range interactions in the sense that the degree distribution is a q-exponential with q constant and above unity. The critical value αA/d = 1 that emerges in many of these properties is replaced by αA/d = 1/2 for the β-exponent which characterizes the time evolution of the connectivity of sites. The second regime is still non-Boltzmannian, now with moderately long-range interactions, and reflects in an index q monotonically decreasing with αA/d increasing from its critical value to a characteristic value αA/d ≃ 5. Finally, the third regime is Boltzmannian-like (with q ≃ 1), and corresponds to short-range interactions. *

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Section: Introductionsupporting

confidence: 83%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Scaling properties of d -dimensional complex networks

et al. 2019

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“…The so-called q-exponential function, arising when considering constrained optimization problems based on the entropic measure S q , plays a central role within the nonextensive thermostatistical formalism [1,2,24]. This function is defined as…”

Section: Nonlinear Partial Differential Evolution Equations Associatementioning

confidence: 99%

“…These functions reduce to the standard exponential and Gaussian ones in the q → 1 limit. Just to list a few recent examples of applications of the nonextensive thermostatistical formalism, we can mention applications to self-gravitating systems [23], to the dynamics of vortices in type II superconductors [19], and to complex networks [24]. The remarkably diverse scenarios within which q-exponentials and q-Gaussians appear to be relevant suggests that the dynamical mechanisms giving rise to these distributions are not unique.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear Wave Equations Related to Nonextensive Thermostatistics

Plastino

Wedemann

2017

Entropy

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Abstract:We advance two nonlinear wave equations related to the nonextensive thermostatistical formalism based upon the power-law nonadditive S q entropies. Our present contribution is in line with recent developments, where nonlinear extensions inspired on the q-thermostatistical formalism have been proposed for the Schroedinger, Klein-Gordon, and Dirac wave equations. These previously introduced equations share the interesting feature of admitting q-plane wave solutions. In contrast with these recent developments, one of the nonlinear wave equations that we propose exhibits real q-Gaussian solutions, and the other one admits exponential plane wave solutions modulated by a q-Gaussian. These q-Gaussians are q-exponentials whose arguments are quadratic functions of the space and time variables. The q-Gaussians are at the heart of nonextensive thermostatistics.The wave equations that we analyze in this work illustrate new possible dynamical scenarios leading to time-dependent q-Gaussians. One of the nonlinear wave equations considered here is a wave equation endowed with a nonlinear potential term, and can be regarded as a nonlinear Klein-Gordon equation. The other equation we study is a nonlinear Schroedinger-like equation.

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A Nonlinear Fokker-Planck Description of Continuous Neural Network Dynamics

Wedemann

Plastino

2019

Artificial Neural Networks and Machine Learning – ICANN 2019: Theoretical Neural Computation

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Role of dimensionality in complex networks

Cited by 50 publications

References 49 publications

Scaling properties of d -dimensional complex networks

Scaling properties of d -dimensional complex networks

Nonlinear Wave Equations Related to Nonextensive Thermostatistics

A Nonlinear Fokker-Planck Description of Continuous Neural Network Dynamics

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