Center (ring theory)

In algebra, the center of a ring R is the subring consisting of the elements x such that xy = yx for all elements y in R. It is a commutative ring and is denoted as $Z(R)$ ; "Z" stands for the German word Zentrum, meaning "center".

If R is a ring, then R is an associative algebra over its center. Conversely, if R is an associative algebra over a commutative subring S, then S is a subring of the center of R.

Examples

The center of a commutative ring R is R itself.
The center of a skew-field is a field.
The center of the (full) matrix ring with entries in a commutative ring R consists of R-scalar multiples of the identity matrix.^[1]
Let F be a field extension of a field k and R an algebra over k. Then $Z(R\otimes _{k}F)=Z(R)\otimes _{k}F.$
The center of the universal enveloping algebra of a Lie algebra plays an important role in the representation theory. For example, a Casimir element is an element of such a center that is used to analyze Lie algebra representations. See also: Harish-Chandra isomorphism.

Notes

↑ "vector spaces - A linear operator commuting with all such operators is a scalar multiple of the identity. - Mathematics Stack Exchange". Math.stackexchange.com. Retrieved 2017-07-22.

References

Bourbaki, Algebra.

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Center (ring theory)

Examples

See also

Notes

References