Krasner's lemma explained

In number theory, more specifically in p-adic analysis, Krasner's lemma is a basic result relating the topology of a complete non-archimedean field to its algebraic extensions.

Statement

Let K be a complete non-archimedean field and let be a separable closure of K. Given an element α in, denote its Galois conjugates by α₂, ..., α_n. Krasner's lemma states:^[1] ^[2]

if an element β of is such that

\left|\alpha-\beta\right|<\left|\alpha-\alpha_{i\right|fori=2,...,n}

then K(α) ⊆ K(β).

Applications

Krasner's lemma can be used to show that
ak{p}

-adic completion and separable closure of global fields commute.^[3] In other words, given

ak{p}

a prime of a global field L, the separable closure of the

ak{p}

-adic completion of L equals the

\overline{ak{p}}

-adic completion of the separable closure of L (where

\overline{ak{p}}

is a prime of above

ak{p}

Another application is to proving that C_p - the completion of the algebraic closure of Q_p - is algebraically closed.^[4] ^[5]

Generalization

Krasner's lemma has the following generalization.^[6] Consider a monic polynomial

	*)
f
	k

of degree n > 1with coefficients in a Henselian field (K, v) and roots in thealgebraic closure . Let I and J be two disjoint,non-empty sets with union . Moreover, consider apolynomial

g=\prod_i\in(X-\alpha_i)

with coefficients and roots in . Assume

\foralli\inI\forallj\inJ:v(\alpha_i-\alpha

	*).

	j

Then the coefficients of the polynomials

	:=\prod*
g
	i\inI

	*), h
(X-\alpha
	i

	:=\prod*

	j\inJ

	*)
(X-\alpha
	j

are contained in the field extension of K generated by thecoefficients of g. (The original Krasner's lemma corresponds to the situation where g has degree 1.)

Notes

Lemma 8.1.6 of
Lorenz (2008) p.78
Proposition 8.1.5 of
Proposition 10.3.2 of
Lorenz (2008) p.80
Brink (2006), Theorem 6

References

Brink . David . New light on Hensel's Lemma . 24 . 4 . Expositiones Mathematicae . 291–306 . 2006 . 0723-0869 . 1142.12304 . 10.1016/j.exmath.2006.01.002.
Book: Lorenz, Falko . Algebra. Volume II: Fields with Structure, Algebras and Advanced Topics . 2008 . . 978-0-387-72487-4 . 1130.12001 .
Book: Narkiewicz, Władysław . Elementary and analytic theory of algebraic numbers . 3rd . 1159.11039 . Springer Monographs in Mathematics . Berlin . . 3-540-21902-1 . 2004 . 206 .