A New Estimate of the Cutoff Value in the Bak-Sneppen Model

Abstract

We present evidence that the Bak-Sneppen model of evolution on N vertices requires N3 iterates to reach equilibrium. This is substantially more than previous authors suggested (on the order of N2). Based on that estimate, we present a novel algorithm inspired by previous rank-driven analyses of the model allowing for direct simulation of the model with populations of up to N = 25600 for 2· N3 iterations. These extensive simulations suggest a cutoff value of x* = 0.66692 0.00003, a value slightly lower than previously estimated yet still distinctly above 2/3. We also study how the cutoff values x*N at finite N approximate the conjectured value x* at N=∞. Assuming x*N-x*∞ N-, we find that =0.978 0.025, which is significantly lower than previous estimates (≈ 1.4).