Uniform Local Amenability implies Property A
Abstract: In this short note we answer a query of Brodzki, Niblo, \v{S}pakula, Willett and Wright by showing that all bounded degree uniformly locally amenable graphs have Property A. For the second result of the note recall that Kaiser proved that if $\Gamma$ is a finitely generated group and ${H_i}\infty_{i=1}$ is a Farber sequence of finite index subgroups, then the associated Schreier graph sequence is of Property A if and only if the group is amenable. We show however, that there exist a non-amenable group and a nested sequence of finite index subgroups ${H_i}\infty_{i=1}$ such that $\cap H={e_\Gamma}$, and the associated Schreier graph sequence is of Property A.
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