Project-Team:GRACE

Inria | Raweb 2014 | Presentation of the Project-Team GRACE | GRACE Web Site


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Section: New Results

A new bound on the number of rational points of arbitrary projective varieties

In [38] , the authors asked for a general upper bound on the number of rational points of a (possibly reducible) equidimensional variety $X \subseteq 𝐏^{n}$ of dimension $d$ and degree $δ$ . They conjectured that

| X (𝐅_{q}) | \leq δ (π_{d} - π_{2 d - n}) + π_{2 d_{n}},

(1)

where for all positive integer $ℓ$ , $π_{ℓ}$ is defined as the number of rational points of the projective space of dimension $ℓ$ over $𝐅_{q}$ . That is to say, $π_{ℓ} = \frac{q^{ℓ + 1} - 1}{q - 1} .$

By combining algebraic geometric methods with a combinatorial method of double counting, A. Couvreur proved this conjecture [32] and got a more general upper bound on the number of rational points of arbitrary varieties (possibly non-equidimensional). In addition, he proved that (1 ) is sharp by providing examples of varieties reaching this bound.

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