Orders of products of horizontal class transpositions
Abstract
The class transposition group CT(Z) was introduced by S. Kohl in 2010. It is a countable subgroup of the permutation group Sym(Z) of the set of integers Z. We study products of two class transpositions CT(Z) and give a partial answer to the question 18.48 posed by S. Kohl in the Kourovka notebook. We prove that in the group CT∞, which is a subgroup of CT(Z) and generated by horizontal class transpositions, the order of the product of a pair of horizontal class transpositions belongs to the set \1,2,3,4,6,12\, and any number from this set is the order of the product of a pair of horizontal class transpositions.
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