Application of the notion of $Φ$-object to the study of p-class groups and p-ramified torsion groups of abelian extensions

Abstract: We revisit, in an elementary way, the classical statement of various Main Conjectures'' for $p$-class groups $\mathcal{H}_K$ and $p$-ramified torsion groups $\mathcal{T}_K$ of abelian fields $K$, in the non semi-simple case $p \mid [K : \mathbb{Q}]$. The classicalalgebraic'' definition of the $p$-adic isotopic components, $\mathcal{H}^{\rm alg}{K,\varphi}$, used in the literature, is inappropriate with respect to analytical formulas. For that reason we have introduced, in the 1970's, an arithmetic'' definition, $\mathcal{H}^{\rm ar}{K,\varphi}$, in perfect correspondence with all analytical formulas and giving a naturalMain Conjecture'', still unproved for real fields in the non semi-simple case. The two notions coincide for relative class groups $\mathcal{H}K^-$ and groups $\mathcal{T}_K$ since, in $p$-extensions, transfer maps are injective for these groups but not necessarily for real class groups. Numerical evidence of the gap between the two notions is given (Examples A.2.2, A.2.3) and PARI calculations corroborate that the true Real Main Conjecture for $K$ writes on the form $# \mathcal{H}^{\rm ar}{K,\varphi} = # (\mathcal{E}K / \hat{\mathcal{E}}_K \, \mathcal{F}{!K}){\varphi}$, in terms of units $\mathcal{E}_K$, $\hat{\mathcal{E}}_K$ (units of the strict subfields) and $\mathcal{F}_K$ (Leopoldt's cyclotomic units). A recent approach, conjecturing the capitulation of $\mathcal{H}_K$ in some auxiliary cyclotomic extensions $K(\mu\ell^{})$, proves the difficult real case.