Appendix:Glossary of abstract algebra

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Template:Wikipedia This is a glossary of abstract algebra

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A

associative: Of an operator $*$ , such that, for any operands $a, b, c, (a * b) * c = a * (b * c)$ .

C

commutative: Of an operator $*$ *, such that, for any operands $a, b, a * b = b * a$ .

D

distributive: Of an operation $*$ with respect to the operation $o$ , such that $a * (b o c) = (a * b) o (a * c)$ .

F

field: A set having two operations called addition and multiplication under both of which all the elements of the set are commutative and associative; for which multiplication distributes over addition; and for both of which there exist an identity element and an inverse element.

G

group: A set with an associative binary operation, under which there exists an identity element, and such that each element has an inverse.

I

ideal: A subring closed under multiplication by its containing ring.

identity element: A member of a structure which, when applied to any other element via a binary operation induces an identity mapping.

M

monoid: A set which is closed under an associative binary operation, and which contains an element which is an identity for the operation.

R

ring: An algebraic structure which is a group under addition and a monoid under multiplication.

S

semigroup: Any set for which there is a binary operation that is both closed and associative.

semiring: An algebraic structure similar to a ring, but without the requirement that each element must have an additive inverse.

See also

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English glossaries of mathematics