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- Completely_regular_semigroup abstract "In mathematics, a completely regular semigroup is a semigroup in which every element is in some subgroup of the semigroup. The class of completely regular semigroups forms an important subclass of the class of regular semigroups, the class of inverse semigroups being another such subclass. A H Clifford was the first to publish a major paper on completely regular semigroups though he used the terminology "semigroups admitting relative inverses" to refer to such semigroups. The name "completely regular semigroup" stems from Lyapin's book on semigroups. In the Russian literature, completely regular semigroups are often called "Clifford semigroups".In the English literature, the name "Clifford semigroup" is used synonymously to "inverse Clifford semigroup", and refers to a completely regular inverse semigroup.In a completely regular semigroup, each Green H-class is a group and the semigroup is the union of these groups. Hence completely regular semigroups are also referred to as "unions of groups". Epigroups generalize this notion and their class includes all completely regular semigroups.".
- Completely_regular_semigroup wikiPageID "22665441".
- Completely_regular_semigroup wikiPageRevisionID "577985367".
- Completely_regular_semigroup hasPhotoCollection Completely_regular_semigroup.
- Completely_regular_semigroup subject Category:Algebraic_structures.
- Completely_regular_semigroup subject Category:Semigroup_theory.
- Completely_regular_semigroup type AlgebraicStructures.
- Completely_regular_semigroup type Artifact100021939.
- Completely_regular_semigroup type Object100002684.
- Completely_regular_semigroup type PhysicalEntity100001930.
- Completely_regular_semigroup type Structure104341686.
- Completely_regular_semigroup type Whole100003553.
- Completely_regular_semigroup type YagoGeoEntity.
- Completely_regular_semigroup type YagoPermanentlyLocatedEntity.
- Completely_regular_semigroup comment "In mathematics, a completely regular semigroup is a semigroup in which every element is in some subgroup of the semigroup. The class of completely regular semigroups forms an important subclass of the class of regular semigroups, the class of inverse semigroups being another such subclass. A H Clifford was the first to publish a major paper on completely regular semigroups though he used the terminology "semigroups admitting relative inverses" to refer to such semigroups.".
- Completely_regular_semigroup label "Completely regular semigroup".
- Completely_regular_semigroup sameAs m.05zy331.
- Completely_regular_semigroup sameAs Q5156534.
- Completely_regular_semigroup sameAs Q5156534.
- Completely_regular_semigroup sameAs Completely_regular_semigroup.
- Completely_regular_semigroup wasDerivedFrom Completely_regular_semigroup?oldid=577985367.
- Completely_regular_semigroup isPrimaryTopicOf Completely_regular_semigroup.