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Ramification group

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In number theory, more specifically in local class field theory, the ramification groups are a filtration of the Galois group of a local field extension, which gives detailed information on the ramification phenomena of the extension.

Ramification theory of valuations

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In mathematics, the ramification theory of valuations studies the set of extensions of a valuation v of a field K to an extension L of K. It is a generalization of the ramification theory of Dedekind domains.[1][2]

The structure of the set of extensions is known better when L/K is Galois.

Decomposition group and inertia group

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Let (Kv) be a valued field and let L be a finite Galois extension of K. Let Sv be the set of equivalence classes of extensions of v to L and let G be the Galois group of L over K. Then G acts on Sv by σ[w] = [w ∘ σ] (i.e. w is a representative of the equivalence class [w] ∈ Sv and [w] is sent to the equivalence class of the composition of w with the automorphism σ : LL; this is independent of the choice of w in [w]). In fact, this action is transitive.

Given a fixed extension w of v to L, the decomposition group of w is the stabilizer subgroup Gw of [w], i.e. it is the subgroup of G consisting of all elements that fix the equivalence class [w] ∈ Sv.

Let mw denote the maximal ideal of w inside the valuation ring Rw of w. The inertia group of w is the subgroup Iw of Gw consisting of elements σ such that σx ≡ x (mod mw) for all x in Rw. In other words, Iw consists of the elements of the decomposition group that act trivially on the residue field of w. It is a normal subgroup of Gw.

The reduced ramification index e(w/v) is independent of w and is denoted e(v). Similarly, the relative degree f(w/v) is also independent of w and is denoted f(v).

Ramification groups in lower numbering

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Ramification groups are a refinement of the Galois group of a finite Galois extension of local fields. We shall write for the valuation, the ring of integers and its maximal ideal for . As a consequence of Hensel's lemma, one can write for some where is the ring of integers of .[3] (This is stronger than the primitive element theorem.) Then, for each integer , we define to be the set of all that satisfies the following equivalent conditions.

  • (i) operates trivially on
  • (ii) for all
  • (iii)

The group is called -th ramification group. They form a decreasing filtration,

In fact, the are normal by (i) and trivial for sufficiently large by (iii). For the lowest indices, it is customary to call the inertia subgroup of because of its relation to splitting of prime ideals, while the wild inertia subgroup of . The quotient is called the tame quotient.

The Galois group and its subgroups are studied by employing the above filtration or, more specifically, the corresponding quotients. In particular,

  • where are the (finite) residue fields of .[4]
  • is unramified.
  • is tamely ramified (i.e., the ramification index is prime to the residue characteristic.)

The study of ramification groups reduces to the totally ramified case since one has for .

One also defines the function . (ii) in the above shows is independent of choice of and, moreover, the study of the filtration is essentially equivalent to that of .[5] satisfies the following: for ,

Fix a uniformizer of . Then induces the injection where . (The map actually does not depend on the choice of the uniformizer.[6]) It follows from this[7]

  • is cyclic of order prime to
  • is a product of cyclic groups of order .

In particular, is a p-group and is solvable.

The ramification groups can be used to compute the different of the extension and that of subextensions:[8]

If is a normal subgroup of , then, for , .[9]

Combining this with the above one obtains: for a subextension corresponding to ,

If , then .[10] In the terminology of Lazard, this can be understood to mean the Lie algebra is abelian.

Example: the cyclotomic extension

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The ramification groups for a cyclotomic extension , where is a -th primitive root of unity, can be described explicitly:[11]

where e is chosen such that .

Example: a quartic extension

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Let K be the extension of Q2 generated by . The conjugates of are , , .

A little computation shows that the quotient of any two of these is a unit. Hence they all generate the same ideal; call it π. generates π2; (2)=π4.

Now , which is in π5.

and which is in π3.

Various methods show that the Galois group of K is , cyclic of order 4. Also:

and

so that the different

satisfies X4 − 4X2 + 2, which has discriminant 2048 = 211.

Ramification groups in upper numbering

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If is a real number , let denote where i the least integer . In other words, Define by[12]

where, by convention, is equal to if and is equal to for .[13] Then for . It is immediate that is continuous and strictly increasing, and thus has the continuous inverse function defined on . Define . is then called the v-th ramification group in upper numbering. In other words, . Note . The upper numbering is defined so as to be compatible with passage to quotients:[14] if is normal in , then

for all

(whereas lower numbering is compatible with passage to subgroups.)

Herbrand's theorem

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Herbrand's theorem states that the ramification groups in the lower numbering satisfy (for where is the subextension corresponding to ), and that the ramification groups in the upper numbering satisfy .[15][16] This allows one to define ramification groups in the upper numbering for infinite Galois extensions (such as the absolute Galois group of a local field) from the inverse system of ramification groups for finite subextensions.

The upper numbering for an abelian extension is important because of the Hasse–Arf theorem. It states that if is abelian, then the jumps in the filtration are integers; i.e., whenever is not an integer.[17]

The upper numbering is compatible with the filtration of the norm residue group by the unit groups under the Artin isomorphism. The image of under the isomorphism

is just[18]

See also

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Notes

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  1. ^ Fröhlich, A.; Taylor, M.J. (1991). Algebraic number theory. Cambridge studies in advanced mathematics. Vol. 27. Cambridge University Press. ISBN 0-521-36664-X. Zbl 0744.11001.
  2. ^ Zariski, Oscar; Samuel, Pierre (1976) [1960]. Commutative algebra, Volume II. Graduate Texts in Mathematics. Vol. 29. New York, Heidelberg: Springer-Verlag. Chapter VI. ISBN 978-0-387-90171-8. Zbl 0322.13001.
  3. ^ Neukirch (1999) p.178
  4. ^ since is canonically isomorphic to the decomposition group.
  5. ^ Serre (1979) p.62
  6. ^ Conrad
  7. ^ Use and
  8. ^ Serre (1979) 4.1 Prop.4, p.64
  9. ^ Serre (1979) 4.1. Prop.3, p.63
  10. ^ Serre (1979) 4.2. Proposition 10.
  11. ^ Serre, Corps locaux. Ch. IV, §4, Proposition 18
  12. ^ Serre (1967) p.156
  13. ^ Neukirch (1999) p.179
  14. ^ Serre (1967) p.155
  15. ^ Neukirch (1999) p.180
  16. ^ Serre (1979) p.75
  17. ^ Neukirch (1999) p.355
  18. ^ Snaith (1994) pp.30-31

References

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