2020
DOI: 10.1007/978-3-030-57559-5_6
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Chapter V: Beyond Heights: Slopes and Distribution of Rational Points

Abstract: The distribution of rational points of bounded height on algebraic varieties is far from uniform. Indeed the points tend to accumulate on thin subsets which are images of non-trivial finite morphisms. The problem is to find a way to characterise the points in these thin subsets. The slopes introduced by Jean-Benoît Bost are a useful tool for this problem. These notes will present several cases in which this approach is fruitful. We shall also describe the notion of locally accumulating subvarieties which arise… Show more

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Cited by 7 publications
(7 citation statements)
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“…13 For all non-archimedean ν ∈ Val(Q), the adelic measures ω V ν , ω T UT ν "patch together", in the following sense (cf. [38,Corollary 2.23], [34,Theorem 4.33]). Write…”
Section: Tamagawa Measures On Universal Torsorsmentioning
confidence: 99%
See 3 more Smart Citations
“…13 For all non-archimedean ν ∈ Val(Q), the adelic measures ω V ν , ω T UT ν "patch together", in the following sense (cf. [38,Corollary 2.23], [34,Theorem 4.33]). Write…”
Section: Tamagawa Measures On Universal Torsorsmentioning
confidence: 99%
“…(See [34, §3.24].) Definition 2.1 (See [34] Hypotheses 3.27). We call a nice Q-projective variety V almost Fano if it satisfies the following hypotheses.…”
Section: Almost-fano Varietiesmentioning
confidence: 99%
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“…Let M k be the localisation of the Grothendieck ring of varieties over k at the class L of the affine line, that is M k = KVar k [L −1 ]. Our focus will be on studying the asymptotic behaviour of the class [M n ] in M k endowed with the weight topology of [1], following a question raised by Peyre [19,Question 5.4].…”
Section: Introductionmentioning
confidence: 99%