• DocumentCode
    3640060
  • Title

    Connectivity in sub-Poisson networks

  • Author

    Bartlomiej Blaszczyszyn;D. Yogeshwaran

  • Author_Institution
    INRIA-ENS, 23 Avenue d´Italie 75214 Paris, France
  • fYear
    2010
  • Firstpage
    1466
  • Lastpage
    1473
  • Abstract
    We consider a class of point processes (pp), which we call sub-Poisson; these are pp that can be directionally-convexly (dcx) dominated by some Poisson pp. The dcx order has already been shown in [4] useful in comparing various point process characteristics, including Ripley´s and correlation functions as well as shot-noise fields generated by pp, indicating in particular that smaller in the dcx order processes exhibit more regularity (less clustering, less voids) in the repartition of their points. Using these results, in this paper we study the impact of the dcx ordering of pp on the properties of two continuum percolation models, which have been proposed in the literature to address macroscopic connectivity properties of large wireless networks. As the first main result of this paper, we extend the classical result on the existence of phase transition in the percolation of the Gilbert´s graph (called also the Boolean model), generated by a homogeneous Poisson pp, to the class of homogeneous sub-Poisson pp. We also extend a recent result of the same nature for the SINR graph, to sub-Poisson pp. Finally, as examples we show that the so-called perturbed lattices are sub-Poisson. More generally, perturbed lattices provide some spectrum of models that ranges from periodic grids, usually considered in cellular network context, to Poisson ad-hoc networks, and to various more clustered pp including some doubly stochastic Poisson ones.
  • Keywords
    "Interference","Signal to noise ratio","Mathematical model","Ad hoc networks","Joints","Stochastic processes","Lattices"
  • Publisher
    ieee
  • Conference_Titel
    Communication, Control, and Computing (Allerton), 2010 48th Annual Allerton Conference on
  • Print_ISBN
    978-1-4244-8215-3
  • Type

    conf

  • DOI
    10.1109/ALLERTON.2010.5707086
  • Filename
    5707086