Growth of periodic Grigorchuk groups
Abstract
On torsion Grigorchuk groups we construct random walks of finite entropy and power-law tail decay with non-trivial Poisson boundary. Such random walks provide near optimal volume lower estimates for these groups. In particular, for the first Grigorchuk group G we show that its volume growth function vG,S(n) satisfies that n∞ vG,S(n)/ n=α0, where α0=2λ0≈0.7674, λ0 is the positive root of the polynomial X3-X2-2X-4.
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