International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prime number $p$. Consider the cyclotomic $Z_p$-extension $F_\infty/F$ and denote $F_n$ the ${n}^{\rm th}$ finite subfield and $C_n$ its group of circular units. Then the Galois groups $G_{m,n}=\Gal(F_m/F_n)$ act naturally on the $C_m$'s (for any $m\geq n>> 0$). We compute the Tate cohomology groups $\Hha^i(G_{m,n}, C_m)$ for $i=-1,0$ without assuming anything else neither on $F$ nor on $p$
Abstract. Let d be a positive integer with d 6 ≡ 2 mod 4, and let K = Q(ζpd) for an odd prime p such...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
Let $F$ be a number field, abelian over the rational field, and fix a odd prime number $p$. Consider...
AbstractLetkbe an imaginary abelian number field whose conductor has at most two distinct prime divi...
AbstractFor a real abelian field with a non-cyclic Galois group of order l2, l being an odd prime, t...
International audienceIwasawa's classical asymptotical formula relates the orders of the $p$-parts $...
International audienceIwasawa's classical asymptotical formula relates the orders of the $p$-parts $...
AbstractLetKbe a real abelian number field satisfying certain conditions andKnthenth layer of the cy...
AbstractThe purpose of this paper is to introduce and investigate a conjecture about cyclotomic unit...
AbstractWe compute the index of a certain extension of Sinnott's group of circular units in the grou...
AbstractTo the cyclotomic number fieldKgenerated by the roots of unity of orderfwe attach a Galois m...
Abstract. Let d be a positive integer with d 6 ≡ 2 mod 4, and let K = Q(ζpd) for an odd prime p such...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
International audienceLet $F$ be a number field, abelian over the rational field, and fix a odd prim...
Let $F$ be a number field, abelian over the rational field, and fix a odd prime number $p$. Consider...
AbstractLetkbe an imaginary abelian number field whose conductor has at most two distinct prime divi...
AbstractFor a real abelian field with a non-cyclic Galois group of order l2, l being an odd prime, t...
International audienceIwasawa's classical asymptotical formula relates the orders of the $p$-parts $...
International audienceIwasawa's classical asymptotical formula relates the orders of the $p$-parts $...
AbstractLetKbe a real abelian number field satisfying certain conditions andKnthenth layer of the cy...
AbstractThe purpose of this paper is to introduce and investigate a conjecture about cyclotomic unit...
AbstractWe compute the index of a certain extension of Sinnott's group of circular units in the grou...
AbstractTo the cyclotomic number fieldKgenerated by the roots of unity of orderfwe attach a Galois m...
Abstract. Let d be a positive integer with d 6 ≡ 2 mod 4, and let K = Q(ζpd) for an odd prime p such...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
International audienceLet $\KST$ be the maximal pro-$p$-extension of the cyclotomic $\Z_p$-extension...
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