Difference between revisions of "Hasse principle"
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− | + | {{MSC|11Dxx|11Gxx}} | |
− | the problem of the existence of rational points on an algebraic | + | |
− | variety over a global field to the analogous problem over local | + | The Hasse principle is one of the central principles of Diophantine |
− | fields. | + | geometry, which reduces the problem of the existence of rational |
+ | points on an algebraic variety over a global field to the analogous | ||
+ | problem over local fields. | ||
Let $M$ be a class of algebraic varieties over a global field $K$. The | Let $M$ be a class of algebraic varieties over a global field $K$. The | ||
Line 13: | Line 15: | ||
all primes $p$, are not empty, it follows that the set of rational | all primes $p$, are not empty, it follows that the set of rational | ||
points $X(\Q)$ is also not empty. The Hasse principle holds for quadrics | points $X(\Q)$ is also not empty. The Hasse principle holds for quadrics | ||
− | + | {{Cite|CaFr}}, and so it is valid for algebraic curves of genus | |
0 (see | 0 (see | ||
− | + | {{Cite|Ca}}). For quadrics over a number field the Hasse | |
principle was stated and proved by H. Hasse in | principle was stated and proved by H. Hasse in | ||
− | + | {{Cite|Ha}}. For cubic hypersurfaces the Hasse principle is | |
not true, in general (see | not true, in general (see | ||
− | + | {{Cite|Ca}}, | |
− | + | {{Cite|Ma}}); a counterexample (over $\Q$) is the projective | |
curve $3x^3+4y^3+5z^3 = 0$ or the projective surface $5x^3+12y^3+9z^3+10t^3=0$. | curve $3x^3+4y^3+5z^3 = 0$ or the projective surface $5x^3+12y^3+9z^3+10t^3=0$. | ||
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[[Galois cohomology|Galois cohomology]]; | [[Galois cohomology|Galois cohomology]]; | ||
[[Weil–Châtelet group|Weil–Châtelet group]], and also | [[Weil–Châtelet group|Weil–Châtelet group]], and also | ||
− | + | {{Cite|CaFr}}, | |
− | + | {{Cite|Ca}}, | |
− | + | {{Cite|Se}}). One says that the Hasse principle holds for $G$ | |
if it holds for $M(G)$. The Hasse principle holds for simply-connected | if it holds for $M(G)$. The Hasse principle holds for simply-connected | ||
and adjoint semi-simple algebraic groups over number fields | and adjoint semi-simple algebraic groups over number fields | ||
− | ( | + | ({{Cite|Se}}, |
− | + | {{Cite|Ch}}). If $G$ is an Abelian variety, then the Hasse | |
principle holds for $G$ if and only if the Shafarevich–Tate group (cf. | principle holds for $G$ if and only if the Shafarevich–Tate group (cf. | ||
[[Galois cohomology|Galois cohomology]]) of $G$ vanishes (see the | [[Galois cohomology|Galois cohomology]]) of $G$ vanishes (see the | ||
examples in | examples in | ||
− | + | {{Cite|Ru}}, | |
− | + | {{Cite|Ko}}). | |
====References==== | ====References==== | ||
− | + | {| | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ca}}||valign="top"| J.W.S. Cassels, "Diophantine equations with special reference to elliptic curves" ''J. London Math. Soc.'', '''41''' (1966) pp. 193–291 | |
− | + | |- | |
− | + | |valign="top"|{{Ref|CaFr}}||valign="top"| J.W.S. Cassels (ed.) A. Fröhlich (ed.), ''Algebraic number theory'', Acad. Press (1967) | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ch}}||valign="top"| V. Chernusov, "The Hasse principle for groups of type $E_8$", Minsk (1988) (In Russian) | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ha}}||valign="top"| H. Hasse, "Darstellbarkeit von Zahlen durch quadratische Formen in einem beliebigen algebraischen Zahlkörper" ''J. Reine Angew. Math.'', '''153''' (1924) pp. 113–130 | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ko}}||valign="top"| V. Kolyvagin, "The Mordell–Weil groups and the Shafarevich–Tate groups of Weil's elliptic curves" ''Izv. Akad. Nauk. SSSR Ser. Mat.'', '''52''' : 6 (1988) | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ma}}||valign="top"| Yu.I. Manin, "Cubic forms. Algebra, geometry, arithmetic", North-Holland (1974) (Translated from Russian) | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Ru}}||valign="top"| K. Rubin, "Tate–Shafarevich groups and $L$-functions of elliptic curves with complex multiplication" ''Invent. Math.'', '''89''' (1987) pp. 527–560 | |
− | + | |- | |
− | + | |valign="top"|{{Ref|Se}}||valign="top"| J.-P. Serre, "Cohomologie Galoisienne", Springer (1964) | |
+ | |- | ||
+ | |} |
Latest revision as of 15:48, 17 February 2012
2020 Mathematics Subject Classification: Primary: 11Dxx Secondary: 11Gxx [MSN][ZBL]
The Hasse principle is one of the central principles of Diophantine geometry, which reduces the problem of the existence of rational points on an algebraic variety over a global field to the analogous problem over local fields.
Let $M$ be a class of algebraic varieties over a global field $K$. The Hasse principle holds in $M$ if for any $X$ in $M$ such that for all non-trivial absolute valuations $\nu$ on $K$ the set of $K_\nu$-rational points $X(K_\nu)$ of $X$ is non-empty, the set of $K$-rational points $X(K)$ is also not empty (where $K_\nu$ is the completion of $K$ relative to $\nu$). In particular, if $K$ is the field $\Q$ of rational numbers, then if the set of real points $X(\R)$ and the set of $p$-adic points $\Q_p$, for all primes $p$, are not empty, it follows that the set of rational points $X(\Q)$ is also not empty. The Hasse principle holds for quadrics [CaFr], and so it is valid for algebraic curves of genus 0 (see [Ca]). For quadrics over a number field the Hasse principle was stated and proved by H. Hasse in [Ha]. For cubic hypersurfaces the Hasse principle is not true, in general (see [Ca], [Ma]); a counterexample (over $\Q$) is the projective curve $3x^3+4y^3+5z^3 = 0$ or the projective surface $5x^3+12y^3+9z^3+10t^3=0$.
Let $G$ be an algebraic group over $K$ and let $M(G)$ be the class of algebraic varieties consisting of all principal homogeneous spaces over $G$ (see Galois cohomology; Weil–Châtelet group, and also [CaFr], [Ca], [Se]). One says that the Hasse principle holds for $G$ if it holds for $M(G)$. The Hasse principle holds for simply-connected and adjoint semi-simple algebraic groups over number fields ([Se], [Ch]). If $G$ is an Abelian variety, then the Hasse principle holds for $G$ if and only if the Shafarevich–Tate group (cf. Galois cohomology) of $G$ vanishes (see the examples in [Ru], [Ko]).
References
[Ca] | J.W.S. Cassels, "Diophantine equations with special reference to elliptic curves" J. London Math. Soc., 41 (1966) pp. 193–291 |
[CaFr] | J.W.S. Cassels (ed.) A. Fröhlich (ed.), Algebraic number theory, Acad. Press (1967) |
[Ch] | V. Chernusov, "The Hasse principle for groups of type $E_8$", Minsk (1988) (In Russian) |
[Ha] | H. Hasse, "Darstellbarkeit von Zahlen durch quadratische Formen in einem beliebigen algebraischen Zahlkörper" J. Reine Angew. Math., 153 (1924) pp. 113–130 |
[Ko] | V. Kolyvagin, "The Mordell–Weil groups and the Shafarevich–Tate groups of Weil's elliptic curves" Izv. Akad. Nauk. SSSR Ser. Mat., 52 : 6 (1988) |
[Ma] | Yu.I. Manin, "Cubic forms. Algebra, geometry, arithmetic", North-Holland (1974) (Translated from Russian) |
[Ru] | K. Rubin, "Tate–Shafarevich groups and $L$-functions of elliptic curves with complex multiplication" Invent. Math., 89 (1987) pp. 527–560 |
[Se] | J.-P. Serre, "Cohomologie Galoisienne", Springer (1964) |
Hasse principle. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hasse_principle&oldid=21144