On the critical threshold for continuum AB percolation

Abstract

Consider a bipartite random geometric graph on the union of two independent homogeneous Poisson point processes in d-space, with distance parameter r and intensities λ,μ. For any λ>0 we consider the percolation threshold μc(λ) associated to the parameter μ. Denoting by λc:= λc(2r) the percolation threshold for the standard Poisson Boolean model with radii r, we show the lower bound μc(λ) c(c/(λ-λc)) for any λ>λc with c>0 a fixed constant. In particular, μc(λ) tends to infinity when λ tends to λc from above.