Geometric scale-free random graphs on mobile vertices: broadcast and percolation times
Abstract
We study the phenomenon of information propagation on mobile geometric scale-free random graphs, where vertices instantaneously pass on information to all other vertices in the same connected component. The graphs we consider are constructed on a Poisson point process of intensity λ>0, and the vertices move over time as simple Brownian motions on either Rd or the d-dimensional torus of volume n, while edges are randomly drawn depending on the locations of the vertices, as well as their a priori assigned marks. This includes mobile versions of the age-dependent random connection model and the soft Boolean model. We show that in the ultrasmall regime of these random graphs, information is broadcast to all vertices on a torus of volume n in poly-logarithmic time and that on Rd, the information will reach the infinite component before time t with stretched exponentially high probability, for any λ>0.
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