On the structure of LC-nilpotent groups
Abstract
For a finite group G, let LC(G) be the subgroup generated by elements x such that, for all y ∈ G and all integers n, the order of xn y divides the least common multiple of the orders of x and y. This subgroup is a nilpotent characteristic subgroup of G. In this article, among other results, we show that a finite solvable group G admits an LC-nilpotent series if and only if G does not contain any 2-Frobenius subgroup of type (p, q, p). As a consequence of this theorem, we conclude that the algebraic system comprising all LC-nilpotent groups forms a variety.
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