AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt conjecture for (k, p) is valid, where k is a finite algebraic number field and Kk is a cyclic extension of prime degree p. A lower bound for the p-adic absolute value of the p-adic regulator Rp(K) of K is also given when k = Q
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...
AbstractLet l a prime number and K a Galois extension over the field of rational numbers, with Galoi...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
AbstractIn this paper, by using an analogue of theorems of Iwasawa (Kenkichi Iwasawa Collected Paper...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
We generalize Waldschmidt's bound for Leopoldt's defect and prove a similar bound for Gross's defect...
We generalize Waldschmidt's bound for Leopoldt's defect and prove a similar bound for Gross's defect...
AbstractFollowing Ax's method a lower bound for the p-adic rank of the group of units in the general...
AbstractWe give a proof of the weak Leopoldt's conjecture à la Perrin-Riou, under some technical con...
We study the Leopoldt conjecture for an abelian extension of a real quadratic field. The method appr...
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...
AbstractLet l a prime number and K a Galois extension over the field of rational numbers, with Galoi...
AbstractThe Leopoldt conjecture for (K, p) is investigated under the assumption that the Leopoldt co...
AbstractIn this paper, by using an analogue of theorems of Iwasawa (Kenkichi Iwasawa Collected Paper...
In studying Leopoldt's conjecture for Galois number fields a sufficient condition is proposed which ...
We generalize Waldschmidt's bound for Leopoldt's defect and prove a similar bound for Gross's defect...
We generalize Waldschmidt's bound for Leopoldt's defect and prove a similar bound for Gross's defect...
AbstractFollowing Ax's method a lower bound for the p-adic rank of the group of units in the general...
AbstractWe give a proof of the weak Leopoldt's conjecture à la Perrin-Riou, under some technical con...
We study the Leopoldt conjecture for an abelian extension of a real quadratic field. The method appr...
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...
AbstractLet l a prime number and K a Galois extension over the field of rational numbers, with Galoi...
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