On HNN-extensions in the class of groups of large odd exponent

Abstract

A sufficient condition for the existence of HNN-extensions in the class of groups of odd exponent n 1 is given in the following form. Let Q be a group of odd exponent n > 248 and G be an HNN-extension of Q. If A ∈ G then let F(A) denote the maximal subgroup of Q which is normalized by A. By τA denote the automorphism of F(A) which is induced by conjugation by A. Suppose that for every A ∈ G, which is not conjugate to an element of Q, the group <τA, F(A)> has exponent n and, in addition, equalities A-k q0 Ak = qk, where qk ∈ Q and k =0, 1, ..., [2-16n] ([2-16n] is the integer part of 2-16n), imply that q0 ∈ F(A). Then the group Q naturally embeds in the quotient G / Gn, that is, there exists an analog of the HNN-extension G of Q in the class of groups of exponent n.

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