On the Zp-extensions of a totally p-adic imaginary quadratic field -- With an appendix by Jean-Francois Jaulent

Abstract

Let k = Q( -m) and p ≥ 3 split in k. We prove new properties of the Zp-extensions K/k, distinct from the cyclotomic one; we do not assume K/k totally ramified, nor the triviality of the p-class group of k. These properties are governed by the p-valuation δp(k) of a Fermat quotient of the fundamental p-unit x of k, which also yields the order of the logarithmic class group \# Hk (Thm. 4.2 extended in App.A to the case of imaginary abelian fields of prime-to-p degree), and allows to generalize the Gold-Sands criterion (Sec. 7). These results are related to the first two elements, HKn1 and HKn2, of the filtrations of the p-class groups in K = n Kn, without any argument of Iwasawa's theory, and provide new perspectives since \# ( HKn2/ HKn1) = \# Hk for n large enough (Thm 7.1). We give a short proof generalizing a result of Kundu-Washington (Thm. 7.8) on the p-class groups in the anti-cyclotomic Zp-extension k ac. We compute, Sec. 9, for p = 3, the first layer k1 ac of k ac, using the Logp-function, and show (Thms. 9.2,9.4) that capitulation of suitable ``classes'' is possible in k ac, suggesting Conjecture 7.10. Finally, we generalize (Thms.10.1,10.7) a result of Ozaki giving large λ's invariants. Calculations and programs are gathered App. C.