Abstract
AbstractThis paper studies the structure and preservational properties of lower bounded HNN extensions of inverse semigroups, as introduced by Jajcayová. We show that if $S^* = [ S;\; U_1,U_2;\; \phi ]$ is a lower bounded HNN extension then the maximal subgroups of $S^*$ may be described using Bass-Serre theory, as the fundamental groups of certain graphs of groups defined from the $\mathcal{D}$ -classes of $S$ , $U_1$ and $U_2$ . We then obtain a number of results concerning when inverse semigroup properties are preserved under the HNN extension construction. The properties considered are completely semisimpleness, having finite $\mathcal{R}$ -classes, residual finiteness, being $E$ -unitary, and $0$ - $E$ -unitary. Examples are given, such as an HNN extension of a polycylic inverse monoid.
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