On upper bounds for the first 2-Betti number
Abstract
This article presents a method for proving upper bounds for the first 2-Betti number of groups using only the geometry of the Cayley graph. As an application we prove that Burnside groups of large prime exponent have vanishing first 2-Betti number. Our approach extends to generalizations of 2-Betti numbers, that are defined using characters. We illustrate this flexibility by generalizing results of Thom-Peterson on q-normal subgroups to this setting.
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