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We prove irreducibility of the scheme of morphisms, of degree large enough, from a smooth elliptic curve to spinor varieties. We give an explicit bound on the degree.

Elliptic curves over function fields with a large set of integral points

Ricardo P. Conceição (2013)

Acta Arithmetica

We construct isotrivial and non-isotrivial elliptic curves over $_{q} (t)$ with an arbitrarily large set of separable integral points. As an application of this construction, we prove that there are isotrivial log-general type varieties over $_{q} (t)$ with a Zariski dense set of separable integral points. This provides a counterexample to a natural translation of the Lang-Vojta conjecture to the function field setting. We also show that our main result provides examples of elliptic curves with an explicit and arbitrarily...

Elliptic curves with $ℚ (ℰ [3]) = ℚ (ζ_{3})$ and counterexamples to local-global divisibility by 9

Laura Paladino (2010)

Journal de Théorie des Nombres de Bordeaux

We give a family $ℱ_{h, β}$ of elliptic curves, depending on two nonzero rational parameters $β$ and $h$ , such that the following statement holds: let $ℰ$ be an elliptic curve and let $ℰ [3]$ be its 3-torsion subgroup. This group verifies $ℚ (ℰ [3]) = ℚ (ζ_{3})$ if and only if $ℰ$ belongs to $ℱ_{h, β}$ .Furthermore, we consider the problem of the local-global divisibility by 9 for points of elliptic curves. The number 9 is one of the few exceptional powers of primes, for which an answer to the local-global divisibility is unknown in the case of such...

Elliptic curves with a rational point of finite order.

Toshihiro Hadano (1982)

Manuscripta mathematica

Elliptic curves with all quadratic twists of positive rank

Tim Dokchitser, Vladimir Dokchitser (2009)

Acta Arithmetica

Elliptic curves with bounded ranks in function field towers

Lisa Berger (2012)

Acta Arithmetica

Elliptic Curves With Complex Multiplication and the Conjecture of Birch and Swinnerton-Dyer.

Karl Rubin (1981)

Inventiones mathematicae

Elliptic curves with j-invariant equals 0 or 1728 over a finite prime field.

Carlos Munuera Gómez (1991)

Extracta Mathematicae

Let p be a prime number, p ≠ 2,3 and Fp the finite field with p elements. An elliptic curve E over Fp is a projective nonsingular curve of genus 1 defined over Fp. Each one of these curves has an isomorphic model given by an (Weierstrass) equation E: y2 = x3 + Ax + B, A,B ∈ Fp with D = 4A3 + 27B2 ≠ 0. The j-invariant of E is defined by j(E) = 1728·4A3/D.The aim of this note is to establish some results concerning the cardinality of the group of points on elliptic curves over Fp with j-invariants...

Elliptic Deformations of Minimally Elliptic Singularities.

Jonathan M. Wahl (1980)

Mathematische Annalen

Elliptic fibres on Enriques surfaces

G. Angermüller, W. Barth (1982)

Compositio Mathematica

Elliptic functions and transcendence

David W. MASSER (1974/1975)

Seminaire de Théorie des Nombres de Bordeaux

Elliptic GW invariants of blowups along curves and surfaces.

Hu, Jianxun, Zhang, Hou-Yang (2005)

International Journal of Mathematics and Mathematical Sciences

Elliptic K3 surfaces as dynamical models and their Hamiltonian monodromy

Daisuke Tarama (2012)

Open Mathematics

This note deals with Lagrangian fibrations of elliptic K3 surfaces and the associated Hamiltonian monodromy. The fibration is constructed through the Weierstraß normal form of elliptic surfaces. There is given an example of K3 dynamical models with the identity monodromy matrix around 12 elementary singular loci.

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