The purpose of this thesis is threefold: firstly, to develop
a systematic theory of presentations of monoid acts; secondly, to study
finiteness conditions on semigroups relating to finite generation of one-sided
congruences; and thirdly, to establish connections between each of these
finiteness conditions, restricted to the class of monoids, with finite
presentability of acts. We find general presentations for various monoid
act constructions/components, leading to a number of finite presentability
results. In particular, we consider subacts, Rees quotients, unions of subacts,
direct products and wreath products. A semigroup 𝑆 is called right
noetherian if every right congruence on 𝑆 is finitely generated. We
present some fundamental properties of right noetherian semigroups, discuss how semigroups relate to their substructures with regard to the property
of being right noetherian, and investigate whether this property is preserved under
various semigroup constructions. Finally, we introduce and study the
condition that every right congruence of finite index on a semigroup is
finitely generated. We call semigroups satisfying this condition f-noetherian.
It turns out that every finitely generated semigroup is f-noetherian. We
investigate, for various semigroup classes, whether the property of being
f-noetherian coincides with finite generation
Date of Award | 1 Dec 2023 |
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Original language | English |
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Awarding Institution | |
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Supervisor | Nik Ruskuc (Supervisor) |
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Finiteness conditions on semigroups relating to their actions and one-sided congruences
Miller, C. (Author). 1 Dec 2023
Student thesis: Doctoral Thesis (PhD)