Difference between revisions of "Noether problem"
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| − | + | The question of the rationality of the field of invariants of a finite group acting by automorphisms on a field of rational functions. More precisely, let $K=\mathbf Q(x_1,\dots,x_n)$ be the field of rational functions in $n$ variables with coefficients in the field $\mathbf Q$ of rational numbers, so that $K$ is a purely [[Transcendental extension|transcendental extension]] of $\mathbf Q$ of transcendence degree $n$. Also, let $G$ be a [[Finite group|finite group]] acting by automorphisms on $K$ by means of permutations of the variables $x_1,\dots,x_n$. The question is now whether the subfield $K^G$ of $K$ consisting of all elements fixed under $G$ is itself a field of rational functions in $n$ (other) variables with coefficients in $\mathbf Q$. This question was raised by E. Noether [[#References|[1]]] in connection with the inverse problem of Galois theory (cf. [[Galois theory, inverse problem of|Galois theory, inverse problem of]]). If the answer to Noether's problem were affirmative, one could construct a [[Galois extension|Galois extension]] of $\mathbf Q$ with a given finite group $G$ (see [[#References|[5]]]). The problem is also closely connected with the [[Lüroth problem|Lüroth problem]]. | |
| − | Frequently, Noether's problem is interpreted more generally as the problem that arises when in the original setting | + | In general, the answer to Noether's problem is negative. The first example of a non-rational field $K^G$ was constructed in [[#References|[2]]], and in this example $G$ is generated by a cyclic permutation of the variables. In [[#References|[3]]] it was established that the necessary condition for the rationality of $K^G$ found in [[#References|[2]]] is also sufficient. The question of rationality of $K^G$ in the case of an Abelian group $G$ is closely connected with the theory of algebraic tori (cf. [[Algebraic torus|Algebraic torus]]) (see [[#References|[4]]]). |
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| + | Frequently, Noether's problem is interpreted more generally as the problem that arises when in the original setting $\mathbf Q$ is replaced by an arbitrary field $k$. This problem has an affirmative solution, for example, when $k$ is algebraically closed and $G$ is Abelian. | ||
====References==== | ====References==== | ||
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====Comments==== | ====Comments==== | ||
| − | For | + | For $k$ arbitrary and $G$ finite Abelian, there is a necessary and sufficient condition for rationality of $K^G$ (see [[#References|[a1]]]). For example, if $k=\mathbf Q$ and $G$ is cyclic of order $8$, then $K^G$ is not rational. |
| − | For | + | For $k=\mathbf C$, the first examples of groups $G$ for which $K^G$ is not rational were constructed by D.J. Saltman [[#References|[a2]]]. He proved that for each prime number $p$ there exists such a group of order $p^9$. |
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> H.W. Lenstra Jr., "Rational functions invariant under a finite abelian group" ''Invent. Math.'' , '''25''' (1974) pp. 299–325</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> D.J. Saltman, "Noether's problem over an algebraically closed field" ''Invent. Math.'' , '''77''' (1984) pp. 71–84</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> H.W. Lenstra Jr., "Rational functions invariant under a finite abelian group" ''Invent. Math.'' , '''25''' (1974) pp. 299–325</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> D.J. Saltman, "Noether's problem over an algebraically closed field" ''Invent. Math.'' , '''77''' (1984) pp. 71–84</TD></TR></table> | ||
Latest revision as of 17:59, 23 November 2014
2020 Mathematics Subject Classification: Primary: 12F [MSN][ZBL]
The question of the rationality of the field of invariants of a finite group acting by automorphisms on a field of rational functions. More precisely, let $K=\mathbf Q(x_1,\dots,x_n)$ be the field of rational functions in $n$ variables with coefficients in the field $\mathbf Q$ of rational numbers, so that $K$ is a purely transcendental extension of $\mathbf Q$ of transcendence degree $n$. Also, let $G$ be a finite group acting by automorphisms on $K$ by means of permutations of the variables $x_1,\dots,x_n$. The question is now whether the subfield $K^G$ of $K$ consisting of all elements fixed under $G$ is itself a field of rational functions in $n$ (other) variables with coefficients in $\mathbf Q$. This question was raised by E. Noether [1] in connection with the inverse problem of Galois theory (cf. Galois theory, inverse problem of). If the answer to Noether's problem were affirmative, one could construct a Galois extension of $\mathbf Q$ with a given finite group $G$ (see [5]). The problem is also closely connected with the Lüroth problem.
In general, the answer to Noether's problem is negative. The first example of a non-rational field $K^G$ was constructed in [2], and in this example $G$ is generated by a cyclic permutation of the variables. In [3] it was established that the necessary condition for the rationality of $K^G$ found in [2] is also sufficient. The question of rationality of $K^G$ in the case of an Abelian group $G$ is closely connected with the theory of algebraic tori (cf. Algebraic torus) (see [4]).
Frequently, Noether's problem is interpreted more generally as the problem that arises when in the original setting $\mathbf Q$ is replaced by an arbitrary field $k$. This problem has an affirmative solution, for example, when $k$ is algebraically closed and $G$ is Abelian.
References
| [1] | E. Noether, "Gleichungen mit vorgeschriebener Gruppe" Math. Ann. , 78 (1917–1918) pp. 221–229 |
| [2] | R.G. Swan, "Invariant rational functions and a problem of Steenrod" Invent. Math. , 7 : 2 (1969) pp. 148–158 |
| [3] | V.E. Voskresenskii, "Rationality of certain algebraic tori" Math. USSR. Izv. , 35 : 5 (1979) pp. 1049–1056 Izv. Akad. Nauk SSSR Ser. Mat. , 35 (1971) pp. 1037–1046 |
| [4] | V.E. Voskresenskii, "Algebraic tori" , Moscow (1977) (In Russian) |
| [5] | N.G. Chebotarev, "Grundzüge der Galois'schen Theorie" , Noordhoff (1950) pp. Chapt. V §4 (Translated from Russian) |
Comments
For $k$ arbitrary and $G$ finite Abelian, there is a necessary and sufficient condition for rationality of $K^G$ (see [a1]). For example, if $k=\mathbf Q$ and $G$ is cyclic of order $8$, then $K^G$ is not rational.
For $k=\mathbf C$, the first examples of groups $G$ for which $K^G$ is not rational were constructed by D.J. Saltman [a2]. He proved that for each prime number $p$ there exists such a group of order $p^9$.
References
| [a1] | H.W. Lenstra Jr., "Rational functions invariant under a finite abelian group" Invent. Math. , 25 (1974) pp. 299–325 |
| [a2] | D.J. Saltman, "Noether's problem over an algebraically closed field" Invent. Math. , 77 (1984) pp. 71–84 |
How to Cite This Entry:
Noether problem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Noether_problem&oldid=11427
Noether problem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Noether_problem&oldid=11427
This article was adapted from an original article by V.L. Popov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article