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- Epigroup abstract "In abstract algebra, an epigroup is a semigroup in which every element has a power that belongs to a subgroup. Formally, for all x in a semigroup S, there exists a positive integer n and a subgroup G of S such that xn belongs to G.Epigroups are known by wide variety of other names, including quasi-periodic semigroup, group-bound semigroup, completely π-regular semigroup, strongly π-regular semigroup (sπr), or just π-regular semigroup (although the latter is ambiguous).More generally, in an arbitrary semigroup an element is called group-bound if it has a power that belongs to a subgroup.Epigroups have applications to ring theory. Many of their properties are studied in this context.Epigroups were fist studied by Douglas Munn in 1961, who called them pseudoinvertible.".
- Epigroup wikiPageID "37300268".
- Epigroup wikiPageRevisionID "587846905".
- Epigroup hasPhotoCollection Epigroup.
- Epigroup subject Category:Semigroup_theory.
- Epigroup comment "In abstract algebra, an epigroup is a semigroup in which every element has a power that belongs to a subgroup.".
- Epigroup label "Epigroup".
- Epigroup sameAs m.0n5vdvp.
- Epigroup sameAs Q5382940.
- Epigroup sameAs Q5382940.
- Epigroup wasDerivedFrom Epigroup?oldid=587846905.
- Epigroup isPrimaryTopicOf Epigroup.