Polynomial ring/Related Articles
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- Algebra : A branch of mathematics concerning the study of structure, relation and quantity.
- Commutative algebra : Branch of mathematics studying commutative rings and related structures.
- Commutativity : A property of a binary operation (such as addition or multiplication), that the two operands may be interchanged without affecting the result.
- Complex number : Numbers of the form a+bi, where a and b are real numbers and i denotes a number satisfying .
- Convolution (mathematics) : A process which combines two functions on a set to produce another function on the set: the value of the product function depends on a range of values of the argument.
- Derivative : The rate of change of a function with respect to its argument.
- Distributivity : A relation between two binary operations on a set generalising that of multiplication to addition: a(b+c)=ab+ac.
- Integral domain : A commutative ring in which the product of two non-zero elements is again non-zero.
- Minimal polynomial : The monic polynomial of least degree which a square matrix or endomorphism satisfies.
- Noetherian ring : A ring satisfying the ascending chain condition on ideals; equivalently a ring in which every ideal is finitely generated.
- Pointwise operation : Method of extending an operation defined on an algebraic struture to a set of functions taking values in that structure.
- Polynomial : A formal expression obtained from constant numbers and one or indeterminates; the function defined by such a formula.
- Ring (mathematics) : Algebraic structure with two operations, combining an abelian group with a monoid.
- Ring homomorphism : Function between two rings which respects the operations of addition and multiplication.
- Scheme (mathematics) : Topological space together with commutative rings for all its open sets, which arises from 'glueing together' spectra (spaces of prime ideals) of commutative rings.
- Serge Lang : (19 May 1927 – 12 September 2005) French-born American mathematician known for his work in number theory and for his mathematics textbooks, including the influential Algebra.