In mathematics, the Manin conjecture describes the conjectural distribution of rational points on an algebraic variety relative to a suitable height function. It was proposed by Yuri I. Manin and his collaborators[1] in 1989 when they initiated a program with the aim of describing the distribution of rational points on suitable algebraic varieties.
Conjecture
Their main conjecture is as follows.
Let
be a Fano variety defined
over a number field,
let
be a height function which is relative to the anticanonical divisor
and assume that
is Zariski dense in .
Then there exists
a non-empty Zariski open subset
such that the counting function
of -rational points of bounded height, defined by
for ,
satisfies
as
Here
is the rank of the Picard group of
and
is a positive constant which
later received a conjectural interpretation by Peyre.[2]
Manin's conjecture has been decided for special families of varieties,[3] but is still open in general.
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Browning, T. D. (2007). "An overview of Manin's conjecture for del Pezzo surfaces". In Duke, William (ed.). Analytic number theory. A tribute to Gauss and Dirichlet. Proceedings of the Gauss-Dirichlet conference, Göttingen, Germany, June 20–24, 2005. Clay Mathematics Proceedings. Vol. 7. Providence, RI: American Mathematical Society. pp. 39–55. ISBN978-0-8218-4307-9. MR2362193. Zbl1134.14017.