Percolation of even sites for random sequential adsorption
classification
🧮 math.PR
keywords
blueadsorptionlambdarandomratesequentialsquaresabove
read the original abstract
Consider random sequential adsorption on a red/blue chequerboard lattice with arrivals at rate $1$ on the red squares and rate $\lambda$ on the blue squares. We prove that the critical value of $\lambda$, above which we get an infinite blue component, is finite and strictly greater than $1$.
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