Quasi-algebraically closed field
In mathematics, a field F is called quasi-algebraically closed (or C1) if every non-constant homogeneous polynomial P over F has a non-trivial zero provided the number of its variables is more than its degree. The idea of quasi-algebraically closed fields was investigated by C. C. Tsen, a student of Emmy Noether, in a 1936 paper (Tsen 1936); and later by Serge Lang in his 1951 Princeton University dissertation and in his 1952 paper (Lang 1952). The idea itself is attributed to Lang's advisor Emil Artin. Formally, if P is a non-constant homogeneous polynomial in variables
- X1, ..., XN,
and of degree d satisfying
- d < N
then it has a non-trivial zero over F; that is, for some xi in F, not all 0, we have
- P(x1, ..., xN) = 0.
In geometric language, the hypersurface defined by P, in projective space of degree N − 2, then has a point over F.
Examples
- Any algebraically closed field is quasi-algebraically closed. In fact, any homogeneous polynomial in at least two variables over an algebraically closed field has a non-trivial zero.[1]
- Any finite field is quasi-algebraically closed by the Chevalley–Warning theorem.[2][3][4]
- Algebraic function fields of dimension 1 over algebraically closed fields are quasi-algebraically closed by Tsen's theorem.[3][5]
- The maximal unramified extension of a complete field with a discrete valuation and a perfect residue field is quasi-algebraically closed.[3]
- A complete field with a discrete valuation and an algebraically closed residue field is quasi-algebraically closed by a result of Lang.[3][6]
- A pseudo algebraically closed field of characteristic zero is quasi-algebraically closed.[7]
Properties
- Any algebraic extension of a quasi-algebraically closed field is quasi-algebraically closed.
- The Brauer group of a finite extension of a quasi-algebraically closed field is trivial.[8][9][10]
- A quasi-algebraically closed field has cohomological dimension at most 1.[10]
Ck fields
Quasi-algebraically closed fields are also called C1. A Ck field, more generally, is one for which any homogeneous polynomial of degree d in N variables has a non-trivial zero, provided
- dk < N,
for k ≥ 1.[11] The condition was first introduced and studied by Lang.[10] If a field is Ci then so is a finite extension.[11][12] The C0 fields are precisely the algebraically closed fields.[13][14]
Lang and Nagata proved that if a field is Ck, then any extension of transcendence degree n is Ck+n.[15][16][17] The smallest k such that K is a Ck field ([math]\displaystyle{ \infty }[/math] if no such number exists), is called the diophantine dimension dd(K) of K.[13]
C1 fields
Every finite field is C1.[7]
C2 fields
Properties
Suppose that the field k is C2.
- Any skew field D finite over k as centre has the property that the reduced norm D∗ → k∗ is surjective.[16]
- Every quadratic form in 5 or more variables over k is isotropic.[16]
Artin's conjecture
Artin conjectured that p-adic fields were C2, but Guy Terjanian found p-adic counterexamples for all p.[18][19] The Ax–Kochen theorem applied methods from model theory to show that Artin's conjecture was true for Qp with p large enough (depending on d).
Weakly Ck fields
A field K is weakly Ck,d if for every homogeneous polynomial of degree d in N variables satisfying
- dk < N
the Zariski closed set V(f) of Pn(K) contains a subvariety which is Zariski closed over K.
A field which is weakly Ck,d for every d is weakly Ck.[2]
Properties
- A Ck field is weakly Ck.[2]
- A perfect PAC weakly Ck field is Ck.[2]
- A field K is weakly Ck,d if and only if every form satisfying the conditions has a point x defined over a field which is a primary extension of K.[20]
- If a field is weakly Ck, then any extension of transcendence degree n is weakly Ck+n.[17]
- Any extension of an algebraically closed field is weakly C1.[21]
- Any field with procyclic absolute Galois group is weakly C1.[21]
- Any field of positive characteristic is weakly C2.[21]
- If the field of rational numbers is weakly C1, then every field is weakly C1.[21]
See also
Citations
- ↑ Fried & Jarden (2008) p.455
- ↑ 2.0 2.1 2.2 2.3 Fried & Jarden (2008) p.456
- ↑ 3.0 3.1 3.2 3.3 Serre (1979) p.162
- ↑ Gille & Szamuley (2006) p.142
- ↑ Gille & Szamuley (2006) p.143
- ↑ Gille & Szamuley (2006) p.144
- ↑ 7.0 7.1 Fried & Jarden (2008) p.462
- ↑ Lorenz (2008) p.181
- ↑ Serre (1979) p.161
- ↑ 10.0 10.1 10.2 Gille & Szamuely (2006) p.141
- ↑ 11.0 11.1 Serre (1997) p.87
- ↑ Lang (1997) p.245
- ↑ 13.0 13.1 Neukirch, Jürgen; Schmidt, Alexander; Wingberg, Kay (2008). Cohomology of Number Fields. Grundlehren der Mathematischen Wissenschaften. 323 (2nd ed.). Springer-Verlag. p. 361. ISBN 3-540-37888-X.
- ↑ Lorenz (2008) p.116
- ↑ Lorenz (2008) p.119
- ↑ 16.0 16.1 16.2 Serre (1997) p.88
- ↑ 17.0 17.1 Fried & Jarden (2008) p.459
- ↑ Terjanian, Guy (1966). "Un contre-example à une conjecture d'Artin" (in French). Comptes Rendus de l'Académie des Sciences, Série A-B 262: A612.
- ↑ Lang (1997) p.247
- ↑ Fried & Jarden (2008) p.457
- ↑ 21.0 21.1 21.2 21.3 Fried & Jarden (2008) p.461
References
- Ax, James; Kochen, Simon (1965). "Diophantine problems over local fields I". Amer. J. Math. 87: 605–630. doi:10.2307/2373065.
- Fried, Michael D.; Jarden, Moshe (2008). Field arithmetic. Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge. 11 (3rd revised ed.). Springer-Verlag. ISBN 978-3-540-77269-9.
- Gille, Philippe; Szamuely, Tamás (2006). Central simple algebras and Galois cohomology. Cambridge Studies in Advanced Mathematics. 101. Cambridge: Cambridge University Press. ISBN 0-521-86103-9.
- Greenberg, M.J. (1969). Lectures of forms in many variables. Mathematics Lecture Note Series. New York-Amsterdam: W.A. Benjamin.
- Lang, Serge (1952), "On quasi algebraic closure", Annals of Mathematics 55: 373–390, doi:10.2307/1969785
- Lang, Serge (1997). Survey of Diophantine Geometry. Springer-Verlag. ISBN 3-540-61223-8.
- Lorenz, Falko (2008). Algebra. Volume II: Fields with Structure, Algebras and Advanced Topics. Springer. pp. 109–126. ISBN 978-0-387-72487-4.
- Serre, Jean-Pierre (1979). Local Fields. Graduate Texts in Mathematics. 67. Springer-Verlag. ISBN 0-387-90424-7.
- Serre, Jean-Pierre (1997). Galois cohomology. Springer-Verlag. ISBN 3-540-61990-9.
- Tsen, C. (1936), "Zur Stufentheorie der Quasi-algebraisch-Abgeschlossenheit kommutativer Körper", J. Chinese Math. Soc. 171: 81–92
Original source: https://en.wikipedia.org/wiki/Quasi-algebraically closed field.
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