Add to ORKGWe study the Leopoldt conjecture for an abelian extension of a real quadratic field. The method approaching this problem in the present paper is to compare representation over Q of the Galois group with that over QP. We study the conjecture for an abelian extension of a real quadratic field
We study in this paper Hida's p-adic Hecke algebra for GL_n over a CM field F. Hida has made a conje...
In this thesis we consider three main problems: the Galois module structure of rings of integers in ...
We prove that number fields with arbitrary degree but weak ramification satisfy the Leopoldt conject...
Let L/K be an extension of number fields where L/ℚ is abelian. We define such an extension to be Leo...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
We study in this paper Hida's p-adic Hecke algebra for GL_n over a CM field F. Hida has made a conje...
In this thesis we consider three main problems: the Galois module structure of rings of integers in ...
We prove that number fields with arbitrary degree but weak ramification satisfy the Leopoldt conject...
Let L/K be an extension of number fields where L/ℚ is abelian. We define such an extension to be Leo...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
In the first chapter of this thesis we explain Leopoldt's conjecture and some equivalent formulation...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
We study in this paper Hida's p-adic Hecke algebra for GL_n over a CM field F. Hida has made a conje...
In this thesis we consider three main problems: the Galois module structure of rings of integers in ...
We prove that number fields with arbitrary degree but weak ramification satisfy the Leopoldt conject...