Connecting homomorphisms associated to Tate sequences
Number Theory
2011-01-11 v1
Abstract
Tate sequences are an important tool for tackling problems related to the (ill-understood) Galois structure of groups of -units. The relatively recent Tate sequence "for small " of Ritter and Weiss allows one to use the sequence without assuming the vanishing of the -class-group, a significant advance in the theory. Associated to Ritter and Weiss's version of the sequence are connecting homomorphisms in Tate cohomology, involving the -class-group, that do not exist in the earlier theory. In the present article, we give explicit descriptions of certain of these connecting homomorphisms under some assumptions on the set .
Cite
@article{arxiv.1101.1850,
title = {Connecting homomorphisms associated to Tate sequences},
author = {Paul Buckingham},
journal= {arXiv preprint arXiv:1101.1850},
year = {2011}
}
Comments
22 pages. To appear in Acta Arithmetica