Add to ORKGLet F be a finite extension field of Qp, A an abelian variety defined over F with ordinary good reduction and with sufficiently many endomorphisms (see the theorem below for a precise statement). In this paper we prove that there exists unique Galois extension M of F such that for a Galois extension K of F, the group N_{K/F}(A) of universal norms is finite if and only if K contains M. Our result generalizes that of J. Coates and R. Greenberg [1] which concerns the case of elliptic curves
AbstractWe examine the Mazur–Tate canonical height pairing defined between an abelian variety over a...
We study the distribution of extensions of a number field $k$ with fixed abelian Galois group $G$, f...
AbstractConditions for the solvability of certain embedding problems can be given in terms of the ex...
AbstractWe examine the Mazur–Tate canonical height pairing defined between an abelian variety over a...
We study the distribution of extensions of a number field $k$ with fixed abelian Galois group $G$, f...
International audienceWe study the distribution of extensions of a number field $k$ with fixed abeli...
AbstractLet k be a global field. In an earlier work we proved that K ⊆ L iff NLkL∗ ⊆ NKkK∗ for any f...
International audienceWe study the distribution of extensions of a number field $k$ with fixed abeli...
We show that under certain conditions a rational number is a norm in a given finite Galois extension...
AbstractOne of the fundamental theorems of global class field theory states that there is a one-to-o...
Let F be a finite extension of Q , and let A be an abelian variety defined over F. Let p be a prime,...
International audienceGiven an abelian variety over a field of zero characteristic, we give an optim...
Let F be a finite extension of Q , and let A be an abelian variety defined over F. Let p be a prime,...
We study the distribution of extensions of a number field k with fixed abelian Galois group G, from ...
AbstractLeonid Stern (1989, J. Number Theory32, 203-219; 1990, J. Number Theory36, 127-132) proves t...
AbstractWe examine the Mazur–Tate canonical height pairing defined between an abelian variety over a...
We study the distribution of extensions of a number field $k$ with fixed abelian Galois group $G$, f...
AbstractConditions for the solvability of certain embedding problems can be given in terms of the ex...
AbstractWe examine the Mazur–Tate canonical height pairing defined between an abelian variety over a...
We study the distribution of extensions of a number field $k$ with fixed abelian Galois group $G$, f...
International audienceWe study the distribution of extensions of a number field $k$ with fixed abeli...
AbstractLet k be a global field. In an earlier work we proved that K ⊆ L iff NLkL∗ ⊆ NKkK∗ for any f...
International audienceWe study the distribution of extensions of a number field $k$ with fixed abeli...
We show that under certain conditions a rational number is a norm in a given finite Galois extension...
AbstractOne of the fundamental theorems of global class field theory states that there is a one-to-o...
Let F be a finite extension of Q , and let A be an abelian variety defined over F. Let p be a prime,...
International audienceGiven an abelian variety over a field of zero characteristic, we give an optim...
Let F be a finite extension of Q , and let A be an abelian variety defined over F. Let p be a prime,...
We study the distribution of extensions of a number field k with fixed abelian Galois group G, from ...
AbstractLeonid Stern (1989, J. Number Theory32, 203-219; 1990, J. Number Theory36, 127-132) proves t...
AbstractWe examine the Mazur–Tate canonical height pairing defined between an abelian variety over a...
We study the distribution of extensions of a number field $k$ with fixed abelian Galois group $G$, f...
AbstractConditions for the solvability of certain embedding problems can be given in terms of the ex...