mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

, particularly

abstract algebra In mathematics, more specifically algebra, abstract algebra or modern algebra is the study of algebraic structures. Algebraic structures include groups, rings, fields, modules, vector spaces, lattices, and algebras over a field. The ter ...

, an algebraic closure of a field ''K'' is an

algebraic extension In mathematics, an algebraic extension is a field extension such that every element of the larger field is algebraic over the smaller field ; that is, if every element of is a root of a non-zero polynomial with coefficients in . A field ext ...

of ''K'' that is

algebraically closed In mathematics, a field is algebraically closed if every non-constant polynomial in (the univariate polynomial ring with coefficients in ) has a root in . Examples As an example, the field of real numbers is not algebraically closed, because ...

. It is one of many closures in mathematics. Using Zorn's lemmaMcCarthy (1991) p.21Kaplansky (1972) pp.74-76 or the weaker

ultrafilter lemma In the mathematical field of set theory, an ultrafilter is a ''maximal proper filter'': it is a filter U on a given non-empty set X which is a certain type of non-empty family of subsets of X, that is not equal to the power set \wp(X) of X (suc ...

, it can be shown that every field has an algebraic closure, and that the algebraic closure of a field ''K'' is unique

up to Two mathematical objects ''a'' and ''b'' are called equal up to an equivalence relation ''R'' * if ''a'' and ''b'' are related by ''R'', that is, * if ''aRb'' holds, that is, * if the equivalence classes of ''a'' and ''b'' with respect to ''R'' ...

isomorphism In mathematics, an isomorphism is a structure-preserving mapping between two structures of the same type that can be reversed by an inverse mapping. Two mathematical structures are isomorphic if an isomorphism exists between them. The word i ...

that fixes every member of ''K''. Because of this essential uniqueness, we often speak of ''the'' algebraic closure of ''K'', rather than ''an'' algebraic closure of ''K''. The algebraic closure of a field ''K'' can be thought of as the largest algebraic extension of ''K''. To see this, note that if ''L'' is any algebraic extension of ''K'', then the algebraic closure of ''L'' is also an algebraic closure of ''K'', and so ''L'' is contained within the algebraic closure of ''K''. The algebraic closure of ''K'' is also the smallest algebraically closed field containing ''K'', because if ''M'' is any algebraically closed field containing ''K'', then the elements of ''M'' that are algebraic over ''K'' form an algebraic closure of ''K''. The algebraic closure of a field ''K'' has the same

cardinality In mathematics, the cardinality of a set is a measure of the number of elements of the set. For example, the set A = \ contains 3 elements, and therefore A has a cardinality of 3. Beginning in the late 19th century, this concept was generalized ...

as ''K'' if ''K'' is infinite, and is

countably infinite In mathematics, a set is countable if either it is finite or it can be made in one to one correspondence with the set of natural numbers. Equivalently, a set is ''countable'' if there exists an injective function from it into the natural number ...

if ''K'' is finite.

Examples

*The

fundamental theorem of algebra The fundamental theorem of algebra, also known as d'Alembert's theorem, or the d'Alembert–Gauss theorem, states that every non- constant single-variable polynomial with complex coefficients has at least one complex root. This includes polynomia ...

states that the algebraic closure of the field of

real number In mathematics, a real number is a number that can be used to measure a ''continuous'' one-dimensional quantity such as a distance, duration or temperature. Here, ''continuous'' means that values can have arbitrarily small variations. Every ...

s is the field of

complex number In mathematics, a complex number is an element of a number system that extends the real numbers with a specific element denoted , called the imaginary unit and satisfying the equation i^= -1; every complex number can be expressed in the fo ...

s. *The algebraic closure of the field of

rational number In mathematics, a rational number is a number that can be expressed as the quotient or fraction of two integers, a numerator and a non-zero denominator . For example, is a rational number, as is every integer (e.g. ). The set of all ra ...

s is the field of

algebraic number An algebraic number is a number that is a root of a non-zero polynomial in one variable with integer (or, equivalently, rational) coefficients. For example, the golden ratio, (1 + \sqrt)/2, is an algebraic number, because it is a root of th ...

s. *There are many countable algebraically closed fields within the complex numbers, and strictly containing the field of algebraic numbers; these are the algebraic closures of transcendental extensions of the rational numbers, e.g. the algebraic closure of Q(π). *For a

finite field In mathematics, a finite field or Galois field (so-named in honor of Évariste Galois) is a field that contains a finite number of elements. As with any field, a finite field is a set on which the operations of multiplication, addition, subtr ...

prime A prime number (or a prime) is a natural number greater than 1 that is not a product of two smaller natural numbers. A natural number greater than 1 that is not prime is called a composite number. For example, 5 is prime because the only ways ...

power order ''q'', the algebraic closure is a

field that contains a copy of the field of order ''q''^''n'' for each positive

integer An integer is the number zero (), a positive natural number (, , , etc.) or a negative integer with a minus sign ( −1, −2, −3, etc.). The negative numbers are the additive inverses of the corresponding positive numbers. In the languag ...

''n'' (and is in fact the union of these copies)..

Existence of an algebraic closure and splitting fields

Let

S = \

be the set of all monic irreducible polynomials in ''K'' 'x'' For each

f_ \in S

, introduce new variables

u_,\ldots,u_

where

d = (f_)

. Let ''R'' be the polynomial ring over ''K'' generated by

u_

for all

\lambda \in \Lambda

and all

i \leq (f_)

. Write :

f_ - \prod_^d (x-u_) = \sum_^ r_ \cdot x^j \in R /math>

with r_ \in R .
Let  ''I'' be the ideal in ''R'' generated by the r_. Since ''I'' is strictly smaller than  ''R'',
Zorn's lemma implies that there exists a maximal ideal ''M'' in ''R'' that contains ''I''.
The field ''K''

₁=''R''/''M'' has the property that every polynomial

f_

with coefficients in ''K'' splits as the product of

x-(u_ + M),

and hence has all roots in ''K''₁. In the same way, an extension ''K''₂ of ''K''₁ can be constructed, etc. The union of all these extensions is the algebraic closure of ''K'', because any polynomial with coefficients in this new field has its coefficients in some ''K''_n with sufficiently large ''n'', and then its roots are in ''K''_n+1, and hence in the union itself. It can be shown along the same lines that for any subset ''S'' of ''K'' 'x'' there exists a

splitting field In abstract algebra, a splitting field of a polynomial with coefficients in a field is the smallest field extension of that field over which the polynomial ''splits'', i.e., decomposes into linear factors. Definition A splitting field of a poly ...

of ''S'' over ''K''.

Separable closure

An algebraic closure ''K^alg'' of ''K'' contains a unique

separable extension In field theory, a branch of algebra, an algebraic field extension E/F is called a separable extension if for every \alpha\in E, the minimal polynomial of \alpha over is a separable polynomial (i.e., its formal derivative is not the zero polyno ...

''K^sep'' of ''K'' containing all (algebraic)

s of ''K'' within ''K^alg''. This subextension is called a separable closure of ''K''. Since a separable extension of a separable extension is again separable, there are no finite separable extensions of ''K^sep'', of degree > 1. Saying this another way, ''K'' is contained in a ''separably-closed'' algebraic extension field. It is unique (

isomorphism).McCarthy (1991) p.22 The separable closure is the full algebraic closure if and only if ''K'' is a

perfect field In algebra, a field ''k'' is perfect if any one of the following equivalent conditions holds: * Every irreducible polynomial over ''k'' has distinct roots. * Every irreducible polynomial over ''k'' is separable. * Every finite extension of ''k' ...

. For example, if ''K'' is a field of characteristic ''p'' and if ''X'' is transcendental over ''K'',

\supset K(X)

is a non-separable algebraic field extension. In general, the

absolute Galois group In mathematics, the absolute Galois group ''GK'' of a field ''K'' is the Galois group of ''K''sep over ''K'', where ''K''sep is a separable closure of ''K''. Alternatively it is the group of all automorphisms of the algebraic closure of ''K'' t ...

of ''K'' is the Galois group of ''K^sep'' over ''K''.

References

* * {{DEFAULTSORT:Algebraic Closure Field extensions

Examples

Existence of an algebraic closure and splitting fields

Separable closure

See also

References