Indices isotypiques des \'el\'ements cyclotomiques

Abstract

Given F a real abelian field, p an odd prime and any Dirichlet character of F we give a method for computing the -index (H1(GS,Zp(r)): CF(r)) where the Tate twist r is an odd integer r≥ 3, the group CF(r) is the group of higher circular units, GS is the Galois group over F of the maximal S ramified algebraic extension of F, and S is the set of places of F dividing p. This -index can now be computed in terms only of elementary arithmetic of finite fields . Our work generalizes previous results by Kurihara who used the assumption that the order of divides p-1.