AbstractLet p be an odd prime number and let θ be a nontrivial even character of the Galois group of Q(ζp)/Q. We prove that the derivative of the Iwasawa power series f(T,θ) is not congruent to zero modulo p, where f(T,θ) is associated to the p-adic L-function Lp(s,θ)
The classical Iwasawa main conjecture identifies two seemingly rather different power series in one ...
Inspired by Warren Sinnott 's method we prove a linear independence result modulo p for the Iwasawa ...
In this paper we give a bound for the Iwasawa lambda invariant of an abelian number field attached t...
In this paper, we prove that the derivative of the Iwasawa power series associated to p-adic L-funct...
Abstract. We extend the result of Anglès [1], namely f ′(T; θ) ≡ 0 (mod p) for the Iwasawa power s...
AbstractWe extend the result of Anglès (2007) [1], namely f′(T;θ)≢0(modp) for the Iwasawa power seri...
AbstractLet f(x, χ) be the Iwasawa power series for the p-adic L-function Lp(s, χ), where χ is an ev...
AbstractLet f(x, χ) be the Iwasawa power series for the p-adic L-function Lp(s, χ), where χ is an ev...
We extend the result of Angles (2007) [1], namely f'(T; theta) not equivalent to 0 (mod p) for ...
We study a class of functional independences that the Iwasawa power series satisfy for both zero and...
Let k be a real abelian number field with Galois group Δ and p an odd prime number. Assume that the ...
AbstractTextLet Lp(s,χ) denote a Leopoldt–Kubota p-adic L-function, where p>2 and χ is a nonprincipa...
We tix a rational prime p. possibly 2. and a CM field K. Let Ai1 denote the minus component of the p...
Let K/F be a quadratic extension of p-adic fields, and χ a character of F∗. A representation (pi, V)...
Inspired by Warren Sinnott 's method we prove a linear independence result modulo p for the Iwasawa ...
The classical Iwasawa main conjecture identifies two seemingly rather different power series in one ...
Inspired by Warren Sinnott 's method we prove a linear independence result modulo p for the Iwasawa ...
In this paper we give a bound for the Iwasawa lambda invariant of an abelian number field attached t...
In this paper, we prove that the derivative of the Iwasawa power series associated to p-adic L-funct...
Abstract. We extend the result of Anglès [1], namely f ′(T; θ) ≡ 0 (mod p) for the Iwasawa power s...
AbstractWe extend the result of Anglès (2007) [1], namely f′(T;θ)≢0(modp) for the Iwasawa power seri...
AbstractLet f(x, χ) be the Iwasawa power series for the p-adic L-function Lp(s, χ), where χ is an ev...
AbstractLet f(x, χ) be the Iwasawa power series for the p-adic L-function Lp(s, χ), where χ is an ev...
We extend the result of Angles (2007) [1], namely f'(T; theta) not equivalent to 0 (mod p) for ...
We study a class of functional independences that the Iwasawa power series satisfy for both zero and...
Let k be a real abelian number field with Galois group Δ and p an odd prime number. Assume that the ...
AbstractTextLet Lp(s,χ) denote a Leopoldt–Kubota p-adic L-function, where p>2 and χ is a nonprincipa...
We tix a rational prime p. possibly 2. and a CM field K. Let Ai1 denote the minus component of the p...
Let K/F be a quadratic extension of p-adic fields, and χ a character of F∗. A representation (pi, V)...
Inspired by Warren Sinnott 's method we prove a linear independence result modulo p for the Iwasawa ...
The classical Iwasawa main conjecture identifies two seemingly rather different power series in one ...
Inspired by Warren Sinnott 's method we prove a linear independence result modulo p for the Iwasawa ...
In this paper we give a bound for the Iwasawa lambda invariant of an abelian number field attached t...
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