Normes d'id\'eaux dans la tour cyclotomique et conjecture de Greenberg

Abstract

Pre-print of a publication in "Annales math\'ematiques du Qu\'ebec". Let k be a totally real number field and let k∞ be its cyclotomic Zp-extension for p totally split in k. This text completes our article entitled: "Approche p-adique de la conjecture de Greenberg pour les corps totalement r\'eels" (Annales Math\'ematiques Blaise Pascal 2017), by means of heuristics on the p-adic behavior of the norms, in kn/k, of the ideals in k∞ ; indeed, this conjecture (on the nullity of the invariants λ et μ of Iwasawa) depends of images in the torsion group Tk of the Galois group of the maximal abelian p-ramified pro-p-extension of k, thus of Artin symbols in a finite extension F/k obtained by Galois descent of Tk. An assumption of distribution of these norms implies λ=μ=0. Several statistics and numerical examples in the quadratic case confirm the probable exactness of such properties which constitute the fundamental obstruction for a proof of Greenberg's conjecture in the sole context of Iwasawa's theory.