Random walk in degree space and the time-dependent Watts-Strogatz model

October 14, 2016 Β· Declared Dead Β· πŸ› Physical Review E

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Authors H. L. Casa Grande, M. Cotacallapa, M. O. Hase arXiv ID 1610.04549 Category physics.soc-ph Cross-listed cond-mat.stat-mech, cs.SI Citations 1 Venue Physical Review E Last Checked 4 months ago
Abstract
In this work, we propose a scheme that provides an analytical estimate for the time-dependent degree distribution of some networks. This scheme maps the problem into a random walk in degree space, and then we choose the paths that are responsible for the dominant contributions. The method is illustrated on the dynamical versions of the ErdΓΆs-RΓ©nyi and Watts-Strogatz graphs, which were introduced as static models in the original formulation. We have succeeded in obtaining an analytical form for the dynamics Watts-Strogatz model, which is asymptotically exact for some regimes.
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