David Vauclair scite author profile

Following Kahn, and Assim and Movahhedi, we look for bounds for the order of the capitulation kernels of higher K-groups of S-integers into abelian S-ramified p-extensions. The basic strategy is to change twists inside some Galois-cohomology groups, which is done via the comparison of Tate Kernels of higher order. We investigate two ways: a global one, valid for twists close to 0 (in a certain sense), and a local one, valid for twists close to 1 in cyclic extensions. The global method produces lower bounds for abelian p-extensions which are S-ramified, but not Z p -embeddable. The local method is close to that of [J. Assim, A. Movahhedi, Bounds for étale capitulation kernels, K-Theory 33 (2004) 199-213], but is improved to take into consideration what happens when S consists of only the p-places. In contrast to the first one, one can expect this second method to produce nontrivial lower bounds in certain Z p -extensions. For example, we construct Z p -extensions in which the capitulation kernel is as big as we want (when letting the twist vary). We also include a complete solution to the problem of comparing Tate Kernels.

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Sur la dualité et la descente d’Iwasawa

Vauclair¹

2009

Ann. inst. Fourier

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On the non commutative Iwasawa main conjecture for abelian varieties over function fields

Vauclair¹,

Trihan²

2017

Preprint

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David Vauclair

Cup-produit, Noyaux de Capitulation étales et Conjecture de Greenberg Généralisée

K_2 et conjecture de Greenberg dans les \mathbb{Z}_p-extensions multiples

Noyaux de Tate et capitulation

Sur la dualité et la descente d’Iwasawa

On the non commutative Iwasawa main conjecture for abelian varieties over function fields

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