The term center or centre is used in various contexts in abstract algebra to denote the set of all those elements that commute with all other elements.
The similarly named notion for a semigroup is defined likewise and it is a subsemigroup.[1][2]
The center of a ring (or an associative algebra) R is the subset of R consisting of all those elements x of R such that xr = rx for all r in R.[3] The center is a commutativesubring of R.
The center of a Lie algebraL consists of all those elements x in L such that [x,a] = 0 for all a in L. This is an ideal of the Lie algebra L.
^Kilp, Mati; Knauer, Ulrich; Mikhalev, Aleksandr V. (2000). Monoids, Acts and Categories. De Gruyter Expositions in Mathematics. Vol. 29. Walter de Gruyter. p. 25. ISBN 978-3-11-015248-7.
^Ljapin, E. S. (1968). Semigroups. Translations of Mathematical Monographs. Vol. 3. Translated by A. A. Brown; J. M. Danskin; D. Foley; S. H. Gould; E. Hewitt; S. A. Walker; J. A. Zilber. Providence, Rhode Island: American Mathematical Soc. p. 96. ISBN 978-0-8218-8641-0.
^Durbin, John R. (1993). Modern Algebra: An Introduction (3rd ed.). John Wiley and Sons. p. 118. ISBN 0-471-51001-7. The center of a ring R is defined to be {c ∈ R: cr = rc for every r ∈ R}., Exercise 22.22
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