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- E-semigroup abstract "In the area of mathematics known as semigroup theory, an E-semigroup is a semigroup in which the idempotents form a subsemigroup.Certain classes of E-semigroups have been studied long before the more general class, in particular, a regular semigroup that is also an E-semigroup is known as an orthodox semigroup.Weipoltshammer proved that the notion of weak inverse (the existence of which is one way to define E-inversive semigroups) can also be used to define/characterize E-semigroups as follows: a semigroup S is an E-semigroup if and only if, for all a and b ∈ S, W(ab) = W(b)W(a), where W(x) ≝ {x ∈ S | xax = x} is the set of weak inverses of x.".
- E-semigroup wikiPageID "43724607".
- E-semigroup wikiPageLength "1178".
- E-semigroup wikiPageOutDegree "11".
- E-semigroup wikiPageRevisionID "678514996".
- E-semigroup wikiPageWikiLink Category:Algebraic_structures.
- E-semigroup wikiPageWikiLink Category:Semigroup_theory.
- E-semigroup wikiPageWikiLink E-dense_semigroup.
- E-semigroup wikiPageWikiLink E-inversive_semigroup.
- E-semigroup wikiPageWikiLink Idempotence.
- E-semigroup wikiPageWikiLink Idempotent.
- E-semigroup wikiPageWikiLink Mathematics.
- E-semigroup wikiPageWikiLink Orthodox_semigroup.
- E-semigroup wikiPageWikiLink Regular_semigroup.
- E-semigroup wikiPageWikiLink Semigroup.
- E-semigroup wikiPageWikiLink Semigroup_theory.
- E-semigroup wikiPageWikiLink Subsemigroup.
- E-semigroup wikiPageWikiLink Weak_inverse.
- E-semigroup wikiPageWikiLinkText "''E''-semigroup".
- E-semigroup hasPhotoCollection E-semigroup.
- E-semigroup wikiPageUsesTemplate Template:Algebra-stub.
- E-semigroup wikiPageUsesTemplate Template:Reflist.
- E-semigroup subject Category:Algebraic_structures.
- E-semigroup subject Category:Semigroup_theory.
- E-semigroup hypernym Semigroup.
- E-semigroup comment "In the area of mathematics known as semigroup theory, an E-semigroup is a semigroup in which the idempotents form a subsemigroup.Certain classes of E-semigroups have been studied long before the more general class, in particular, a regular semigroup that is also an E-semigroup is known as an orthodox semigroup.Weipoltshammer proved that the notion of weak inverse (the existence of which is one way to define E-inversive semigroups) can also be used to define/characterize E-semigroups as follows: a semigroup S is an E-semigroup if and only if, for all a and b ∈ S, W(ab) = W(b)W(a), where W(x) ≝ {x ∈ S | xax = x} is the set of weak inverses of x.".
- E-semigroup label "E-semigroup".
- E-semigroup sameAs m.011sny4d.
- E-semigroup sameAs E-semigrupp.
- E-semigroup sameAs Q18206697.
- E-semigroup sameAs Q18206697.
- E-semigroup wasDerivedFrom E-semigroup?oldid=678514996.
- E-semigroup isPrimaryTopicOf E-semigroup.