Add to ORKGLet V → X be a standard P^2-bundle (Definition below) over a smooth projective surface X with the discriminant locus △ and the associated cyclic cover φ : △^^~ → △ of degree three. The purpose of this paper is (i) to determine the etale l-adic cohomology groups of V (Theorem A), (ii) to give an isomorphism of the intermediate jacobian of V and the Prym variety associated to the triple cover φ as polarized abelian varieties (Theorem B), and (iii) to show the existence of a standard P^2-bundle for a given cyclic cover of degree three over a normal crossing curve on X (Theorem D), under certain conditions of (X, △). An ideal basis of a standard P^2-bundle over a regular local ring is determined (Theorem E)
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International audienceLet φ : X → Y be a (possibly ramied) cover between two algebraic curves of pos...
For a class of non-hyperelliptic genus 3 curves C which are 2-fold coverings of elliptic curves E, w...
We consider the outer pro-2 Galois representation on the algebraic fundamental group of the projecti...
Let V → X be a standard P^2-bundle (Definition below) over a smooth projective surface X with the di...
Let X be a smooth algebraic surface with the function field K and let τ: V → X be a standard P^2-bun...
The aim of the thesis is the study and the classification of the families of elliptic threefolds whi...
Let p:C-->Y be a covering of smooth, projective curves which is a composition of \pi:C-->C'' of degr...
Many mathematicians have studied the classi�cation by the degree d ofembedded smooth projective vari...
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Consider a smooth projective variety over a number field. The image of the associated (complex) Abel...
Let X be a complex connected projective algebraic surface and let L be an ample line bundle on X. Th...
ABSTRACT. We prove that any abelian surface admits a rank 2 Ulrich bundle. Let X ⊂ PN be a projectiv...
Let k k be a field of characteristic zero containing a primitive fifth root of unity. Let X/k X/k be...
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For a class of non-hyperelliptic genus 3 curves C which are 2-fold coverings of elliptic curves E, w...
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