Medial
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- This article is about medial in mathematics. For other uses, see medial (disambiguation).
In abstract algebra, a medial algebra is a set with a binary operation which satisfies the identity
- (x . y) . (u . z) = (x . u) . (y . z), or xy.uz=xu.yz
Its importance arises in the concept of an auto magma object and representation (reconstruction) theorems. The identity xy.uz=xu.yz has been variously called medial, abelian, alternation, transposition, bi-commutative, bisymmetric, surcommutative, entropic, etc. (see External links: Historical comments)
For instance, for two endomorphisms f and g, with the usual operation between functions
- (f*g)(x)= f(x).g(x)
this says we have again a morphism. There are counterexamples for the converse, but not for the cartesian square of the operation.. In particular this is the only equation with the property.
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See also
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External links
- Historical comments J.Jezek and T.Kepka: Medial groupoids Rozpravy CSAV, Rada mat. a prir. ved 93/2 (1983), 93 ppes:Medial (álgebra)
