The Growth of Grigorchuk's Group

Abstract

In 1980 Rostislav Grigorchuk constructed a group G of intermediate growth, and later obtained the following estimates on its growth function: enγ(n) enβ, where β=32(31)≈0.991. Using elementary methods we bring the upper bound down to (2)/(2/η)≈0.767, where η≈0.811 is the real root of the polynomial X3+X2+X-2.

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