1. Weil group of a class formation

2. Weil group of an archimedean local field

3. Weil group of a finite field

4. Weil group of a local field

5. Weil group of a function field

6. Weil group of a number field

7. Weil–Deligne group

8. See also

9. Notes

10. References

In mathematics, a Weil group, introduced by {{harvs|txt|authorlink=André Weil|last=Weil|year=1951}}, is a modification of the absolute Galois group of a local or global field, used in class field theory. For such a field F, its Weil group is generally denoted W_F. There also exists "finite level" modifications of the Galois groups: if E/F is a finite extension, then the relative Weil group of E/F is W_E/F = W_F/{{SubSup|W|E|c}} (where the superscript c denotes the commutator subgroup).

For more details about Weil groups see {{harv|Artin|Tate|2009}} or {{harv|Tate|1979}} or {{harv|Weil|1951}}.

Weil group of a class formation

The Weil group of a class formation with fundamental classes u_E/F ∈ H²(E/F, A^F) is a kind of modified Galois group, used in various formulations of class field theory, and in particular in the Langlands program.

If E/F is a normal layer, then the (relative) Weil group W_E/F of E/F is the extension

1 → A^F → W_E/F → Gal(E/F) → 1

corresponding (using the interpretation of elements in the second group cohomology as central extensions) to the fundamental class u_E/F in H²(Gal(E/F), A^F). The Weil group of the whole formation is defined to be the inverse limit of the Weil groups of all the layers

G/F, for F an open subgroup of G.

The reciprocity map of the class formation (G, A) induces an isomorphism from A^G to the abelianization of the Weil group.

Weil group of an archimedean local field

For archimedean local fields the Weil group is easy to describe: for C it is the group C^× of non-zero complex numbers, and for R it is a non-split extension of the Galois group of order 2 by the group of non-zero complex numbers, and can be identified with the subgroup C^× ∪ j C^× of the non-zero quaternions.

Weil group of a finite field

For finite fields the Weil group is infinite cyclic. A distinguished generator is provided by the Frobenius automorphism. Certain conventions on terminology, such as arithmetic Frobenius, trace back to the fixing here of a generator (as the Frobenius or its inverse).

Weil group of a local field

For a local field of characteristic p > 0, the Weil group is the subgroup of the absolute Galois group of elements that act as a power of the Frobenius automorphism on the constant field (the union of all finite subfields).

For p-adic fields the Weil group is a dense subgroup of the absolute Galois group, and consists of all elements whose image in the Galois group of the residue field is an integral power of the Frobenius automorphism.

More specifically, in these cases, the Weil group does not have the subspace topology, but rather a finer topology. This topology is defined by giving the inertia subgroup its subspace topology and imposing that it be an open subgroup of the Weil group. (The resulting topology is "locally profinite".)

Weil group of a function field

For global fields of characteristic p>0 (function fields), the Weil group is the subgroup of the absolute Galois group of elements that act as a power of the Frobenius automorphism on the constant field (the union of all finite subfields).

Weil group of a number field

For number fields there is no known "natural" construction of the Weil group without using cocycles to construct the extension. The map from the Weil group to the Galois group is surjective, and its kernel is the connected component of the identity of the Weil group, which is quite complicated.

Weil–Deligne group

The Weil–Deligne group scheme (or simply Weil–Deligne group) W′_K of a non-archimedean local field, K, is an extension of the Weil group W_K by a one-dimensional additive group scheme G_a, introduced by {{harvtxt|Deligne|1973|loc=8.3.6}}. In this extension the Weil group acts on the

additive group by

where w acts on the residue field of order q as a→a^q||w||.

The local Langlands correspondence for GL_n over K (now proved) states that there is a natural bijection between isomorphism classes of irreducible admissible representations of GL_n(K) and certain n-dimensional representations of the Weil–Deligne group of K.

The Weil–Deligne group often shows up through its representations. In such cases, the Weil–Deligne group is sometimes taken to be W_K × SL(2,C) or W_K × SU(2,R), or is simply done away with and Weil–Deligne representations of W_K are used instead.^[1]

In the archimedean case, the Weil–Deligne group is simply defined to be Weil group.

See also

• Langlands group
• Shafarevich–Weil theorem

Notes

References

• {{Citation | last1=Artin | first1=Emil | author1-link=Emil Artin | last2=Tate | first2=John | author2-link=John Tate | title=Class field theory | origyear=1952 | url=http://www.ams.org/bookstore-getitem/item=chel-366-h | publisher=AMS Chelsea Publishing, Providence, RI | isbn=978-0-8218-4426-7 | mr=0223335 | year=2009}}
• {{Citation | last1=Deligne | first1=Pierre | author1-link=Pierre Deligne | title=Modular functions of one variable, II (Proc. Internat. Summer School, Univ. Antwerp, Antwerp, 1972) | publisher=Springer-Verlag | location=Berlin, New York | series=Lecture notes in mathematics | doi=10.1007/978-3-540-37855-6_7 | mr=0349635 | year=1973 | volume=349 | chapter=Les constantes des équations fonctionnelles des fonctions L | pages=501–597| isbn=978-3-540-06558-6 }}
• {{Citation

• {{Citation

• {{citation|last=Tate|first= J. |chapter=Number theoretic background |chapter-url=http://www.ams.org/online_bks/pspum332/ |title=Automorphic forms, representations, and L-functions Part 2 |pages= 3–26|series=Proc. Sympos. Pure Math.|volume= XXXIII|publisher= Amer. Math. Soc.|location= Providence, R.I.|year=1979|isbn=978-0-8218-1435-2}}
• {{Citation | last1=Weil | first1=André | author1-link = André Weil | title=Sur la theorie du corps de classes (On class field theory) | year=1951 | journal=Journal of the Mathematical Society of Japan | issn=0025-5645 | volume=3 | pages=1–35 | doi=10.2969/jmsj/00310001}}, reprinted in volume I of his collected papers, {{isbn|0-387-90330-5}}

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