Add to ORKGA theorem of Grothendieck tells us that if the Galois action on the Tate module of an abelian variety factors through a smaller field, then the abelian variety, up to isogeny and finite extension of the base, is itself defined over the smaller field. Inspired by this, we give a Galois descent datum for a motive H over a field by asking that the Galois action on an l-adic realisation factor through a smaller field. We conjecture that this descent datum is effective, that is if a motive H satisfies the above criterion, then it must itself descend to the smaller field. We prove this conjecture for K3 surfaces, under some hypotheses. The proof is based on Madapusi-Pera's extension of the Kuga-Satake construction to arbitrary fields
Final version of the manuscript.Let X be a geometrically split, geometrically irreducible variety ov...
This is the text of my lectures in Catania (Sicily) in April 2001, and at a Group Theory Conference ...
We provide an overview of the construction of categorical semidirect products and discuss their form...
Let F be an abelian extension of an imaginary quadratic field K with Galois group G. We form the Ga...
We prove the isogeny conjecture for A-motives over finitely generated fields K of transcendence degr...
AbstractLet R be a complete discrete valuation Fq-algebra with fraction field K and perfect residue ...
This article investigates congruences of $\mathfrak{p}$-adic representations arising from effective ...
Recently S. Patrikis, J.F. Voloch, and Y. Zarhin have proven, assuming several well-known conjecture...
The thesis starts with two expository chapters. In the first one we discuss abelian varieties with p...
Given a Hida family $\cal{F}$ of tame level $W$, for a quadratic imaginary field $K$ that satisfies ...
date de rédaction: 25 novembre 2011Let $X$ be an smooth projective algebraic variety over a number f...
Throughout this thesis, we develop theory and the algorithms that lead to an effective method to stu...
We consider two K3 surfaces defined over an arbitrary field, together with a smooth proper moduli sp...
Galois cohomology in its current form took shape during the 1950s as a way of formulating class fiel...
Let A be a geometrically simple g-dimensional abelian variety over the rationals. This thesis invest...
Final version of the manuscript.Let X be a geometrically split, geometrically irreducible variety ov...
This is the text of my lectures in Catania (Sicily) in April 2001, and at a Group Theory Conference ...
We provide an overview of the construction of categorical semidirect products and discuss their form...
Let F be an abelian extension of an imaginary quadratic field K with Galois group G. We form the Ga...
We prove the isogeny conjecture for A-motives over finitely generated fields K of transcendence degr...
AbstractLet R be a complete discrete valuation Fq-algebra with fraction field K and perfect residue ...
This article investigates congruences of $\mathfrak{p}$-adic representations arising from effective ...
Recently S. Patrikis, J.F. Voloch, and Y. Zarhin have proven, assuming several well-known conjecture...
The thesis starts with two expository chapters. In the first one we discuss abelian varieties with p...
Given a Hida family $\cal{F}$ of tame level $W$, for a quadratic imaginary field $K$ that satisfies ...
date de rédaction: 25 novembre 2011Let $X$ be an smooth projective algebraic variety over a number f...
Throughout this thesis, we develop theory and the algorithms that lead to an effective method to stu...
We consider two K3 surfaces defined over an arbitrary field, together with a smooth proper moduli sp...
Galois cohomology in its current form took shape during the 1950s as a way of formulating class fiel...
Let A be a geometrically simple g-dimensional abelian variety over the rationals. This thesis invest...
Final version of the manuscript.Let X be a geometrically split, geometrically irreducible variety ov...
This is the text of my lectures in Catania (Sicily) in April 2001, and at a Group Theory Conference ...
We provide an overview of the construction of categorical semidirect products and discuss their form...