@comment{ generated by <http://infoscience.epfl.ch/> }

@InProceedings{LCA-CONF-2005-032,
   abstract    = {Continuum percolation models in which pairs of points of
                 a two-dimensional Poisson point process are connected if
                 they are within some range to each other have been
                 extensively studied. This paper considers a variation in
                 which a connection between two points depends not only on
                 their Euclidean distance, but also on the positions of
                 all other points of the point process. This model has
                 been recently proposed to model interference in radio
                 communication networks. Our main result shows that,
                 despite the infinite range dependencies, percolation
                 occurs in the model when the density of the Poisson point
                 process is greater than the critical density value of the
                 independent model, provided that interference from other
                 nodes can be sufficiently reduced (without vanishing).},
   affiliation = {EPFL},
   author      = {Dousse, O and Franceschetti, M and Macris, N and Meester, R and Thiran, P},
   booktitle   = {Proc. Allerton {C}onference},
   details     = {http://infoscience.epfl.ch/record/63745},
   documenturl = {http://infoscience.epfl.ch/record/63745/files/allerton.pdf},
   keywords    = {Percolation; Wireless networks; Interferences; Poisson Boolean model},
   location    = {Monticello, IL},
   oai-id      = {oai:infoscience.epfl.ch:63745},
   oai-set     = {conf},
   review      = {REVIEWED},
   status      = {PUBLISHED},
   title       = {Percolation in the signal to interference ratio graph},
   unit        = {LCA LCA3},
   year        = 2005
}