Perfect field
In algebra, a field k is said to be 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 is separable.
- Every algebraic extension of k is separable.
- Either k has characteristic 0, or, when k has characteristic p > 0, every element of k is a pth power.
- Either k has characteristic 0, or, when k has characteristic p > 0, the Frobenius endomorphism x→x^{p} is an automorphism of k
- The separable closure of k is algebraically closed.
- Every reduced commutative k-algebra A is a separable algebra; i.e., is reduced for every field extension F/k. (see below)
Otherwise, k is called imperfect.
In particular, all fields of characteristic zero and all finite fields are perfect.
Perfect fields are significant because Galois theory over these fields becomes simpler, since the general Galois assumption of field extensions being separable is automatically satisfied over these fields (see third condition above).
Another important property of perfect fields is that they admit Witt vectors.
More generally, a ring of characteristic p (p a prime) is called perfect if the Frobenius endomorphism is an automorphism.^{[1]} (This is equivalent to the above condition "every element of k is a pth power" for integral domains.)
Contents
Examples
Examples of perfect fields are:
- every field of characteristic zero, e.g. the field of rational numbers, the field of real numbers or the field of complex numbers;
- every finite field, e.g. the field F_{p} = Z/pZ where p is a prime number;
- every algebraically closed field;
- the union of a set of perfect fields totally ordered by extension;
- fields algebraic over a perfect field.
In fact, most fields that appear in practice are perfect. The imperfect case arises mainly in algebraic geometry in characteristic p>0. Every imperfect field is necessarily transcendental over its prime subfield (the minimal subfield), because the latter is perfect. An example of an imperfect field is
- the field
It embeds into the perfect field
Imperfect fields cause technical difficulties because irreducible polynomials can become reducible in the algebraic closure of the base field. For example^{[2]}, consider for an imperfect field of characteristic . Then in its algebraic closure , the following equality holds:
- .
Geometrically, this means that does not define an affine plane curve in .
Field extension over a perfect field
Any finitely generated field extension K over a perfect field k is separably generated, i.e. admits a separating transcendence base, that is, a transcendence base Γ such that K is separable algebraic over k(Γ).^{[3]}
Perfect closure and perfection
One of the equivalent conditions says that, in characteristic p, a field adjoined with all p^{r}-th roots (r≥1) is perfect; it is called the perfect closure of k and usually denoted by .
The perfect closure can be used in a test for separability. More precisely, a commutative k-algebra A is separable if and only if is reduced.^{[4]}
In terms of universal properties, the perfect closure of a ring A of characteristic p is a perfect ring A_{p} of characteristic p together with a ring homomorphism u : A → A_{p} such that for any other perfect ring B of characteristic p with a homomorphism v : A → B there is a unique homomorphism f : A_{p} → B such that v factors through u (i.e. v = fu). The perfect closure always exists; the proof involves "adjoining p-th roots of elements of A", similar to the case of fields.^{[5]}
The perfection of a ring A of characteristic p is the dual notion (though this term is sometimes used for the perfect closure). In other words, the perfection R(A) of A is a perfect ring of characteristic p together with a map θ : R(A) → A such that for any perfect ring B of characteristic p equipped with a map φ : B → A, there is a unique map f : B → R(A) such that φ factors through θ (i.e. φ = θf). The perfection of A may be constructed as follows. Consider the projective system
where the transition maps are the Frobenius endomorphism. The inverse limit of this system is R(A) and consists of sequences (x_{0}, x_{1}, ... ) of elements of A such that for all i. The map θ : R(A) → A sends (x_{i}) to x_{0}.^{[6]}
See also
Notes
- ^ Serre 1979, Section II.4
- ^ Milne, James. Elliptic Curves (PDF). p. 6.
- ^ Matsumura, Theorem 26.2
- ^ Cohn 2003, Theorem 11.6.10
- ^ Bourbaki 2003, Section V.5.1.4, page 111
- ^ Brinon & Conrad 2009, section 4.2
References
- Bourbaki, Nicolas (2003), Algebra II, Springer, ISBN 978-3-540-00706-7
- Brinon, Olivier; Conrad, Brian (2009), CMI Summer School notes on p-adic Hodge theory (PDF), retrieved 2010-02-05
- Serre, Jean-Pierre (1979), Local fields, Graduate Texts in Mathematics, 67 (2 ed.), Springer-Verlag, ISBN 978-0-387-90424-5, MR 0554237
- Cohn, P.M. (2003), Basic Algebra: Groups, Rings and Fields
- Matsumura, H (2003), Commutative ring theory, Translated from the Japanese by M. Reid. Cambridge Studies in Advanced Mathematics, 8 (2nd ed.)
External links
- Hazewinkel, Michiel, ed. (2001) [1994], "Perfect field", Encyclopedia of Mathematics, Springer Science+Business Media B.V. / Kluwer Academic Publishers, ISBN 978-1-55608-010-4