Algebraic norm and capitulation of p-class groups in ramified cyclic p-extensions

Abstract

We examine the phenomenon of capitulation of the p-class group HK of a real number field K in totally ramified cyclic p-extensions L/K of degree pN. Using an elementary property of the algebraic norm L/K, we show that the kernel of capitulation is in relation with the "complexity" of the structure of HL measured via its exponent pe(L) and the length m(L) of the usual filtration \HLi\i 0 associated to HL as Zp[Gal(L/K)]-module. We prove that a sufficient condition of capitulation is given by e(L) ∈ [1, N-s(L)] if m(L) ∈ [ps(L), p(s(L)+1)-1] for s(L) ∈ [0, N-1] (Theorem 1.1); this improves the case of "stability" \#HL = \#HK (i.e., m(L) = 1, s(L)=0, e(L) = e(K)) (Theorem 1.2). Numerical examples (with PARI programs) showing most often capitulation of HK in L, are given, taking the simplest abelian p-extensions L < K(μ), with primes =1 (mod 2pN) over cubic fields with p=2 and real quadratic fields with p=3. Some conjectures on the existence of non-zero densities of such 's are proposed (Conjectures 1.4, 2.4). Capitulation property of other arithmetic invariants is examined.

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