Finitely generated algebra mathematics , a finitely generated algebra commutative associative algebra A over a field K where there exists a finite set of elements a 1 ,...,a n A such that every element of A can be expressed as a polynomial in a 1 ,...,a n K .there exist elements s.t. the evaluation homomorphism at first isomorphism theorem . ideal is a -algebra of finite type, indeed any element of is a polynomial in the cosets with coefficients in. Therefore, we obtain the following characterisation of finitely generated -algebrasthe field K then the algebra is said to be finitely generated over K . Algebras that are not finitely generated are called infinitely generated .Examples The polynomial algebra K is finitely generated. The polynomial algebra in infinitely countably many generators is infinitely generated. The field E = K of rational functions in one variable over an infinite field K is not a finitely generated algebra over K . On the other hand, E is generated over K by a single element, t , as a field . If E /F is a finite field extension then it follows from the definitions that E is a finitely generated algebra over F . Conversely, if E /F is a field extension and E is a finitely generated algebra over F then the field extension is finite. This is called Zariski's lemma . See also integral extension . If G is a finitely generated group then the group ring KG is a finitely generated algebra over K .Properties A homomorphic image of a finitely generated algebra is itself finitely generated. However, a similar property for subalgebras does not hold in general. Hilbert's basis theorem: if A is a finitely generated commutative algebra over a Noetherian ring then every ideal of A is finitely generated, or equivalently, A is a Noetherian ring. Finitely generated reduced commutative algebras are basic objects of consideration in modern algebraic geometry , where they correspond to affine algebraic varieties ; for this reason, these algebras are also referred to as affine algebras . More precisely, given an affine algebraic set we can associate a finitely generated -algebraaffine coordinate ring of ; moreover, if is a regular map between the affine algebraic sets and, we can define a homomorphism of -algebrascontravariant functor from the category of affine algebraic sets with regular maps to the category of reduced finitely generated -algebras: this functor turns outto be an equivalence of categories Finite algebras vs algebras of finite type We recall that a commutative -algebra is a ring homomorphism ; the -module structure of is defined byfinite if it is finitely generated as an -module, i.e. there is a surjective homomorphism of -modulesfinite algebras in terms of quotientspolynomial ring is of finite type but not finite.finite morphisms and morphisms of finite type .
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