Exponent of Self-similar finite p-groups
Abstract
Let p be a prime and G a pro-p group of finite rank that admits a faithful, self-similar action on the p-ary rooted tree. We prove that if the set \g∈ G \ | \ gpn=1\ is a nontrivial subgroup for some n, then G is a finite p-group with exponent at most pn. This applies in particular to power abelian p-groups.
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