A note on Engel elements in the first Grigorchuk group
Abstract
Let be the first Grigorchuk group. According to a result of Bartholdi, the only left Engel elements of are the involutions. This implies that the set of left Engel elements of is not a subgroup. Of particular interest is to wonder whether this happens also for the sets of bounded left Engel elements, right Engel elements, and bounded right Engel elements of . Motivated by this, we prove that these three subsets of coincide with the identity subgroup.
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