Hyperfields, truncated DVRs and valued fields
Abstract
For any two complete discrete valued fields and of mixed characteristic with perfect residue fields, we show that if the -th valued hyperfields of and are isomorphic over for each , then and are isomorphic. More generally, for , if is large enough, then any homomorphism, which is over , from the -th valued hyperfield of to the -th valued hyperfield of can be lifted to a homomorphism from to . We compute such effectively, which depends only on the ramification indices of and . Moreover, if is tamely ramified, then any homomorphism over between the first valued hyperfields is induced from a unique homomorphism of valued fields. Using this lifting result, we deduce a relative completeness theorem of AKE-style in terms of valued hyperfields. We also study some relationships between valued hyperfields, truncated discrete valuation rings, and complete discrete valued fields of mixed characteristic. For a prime number and a positive integer and for large enough , we show that a certain category of valued hyperfields is equivalent to the category of truncated discrete valuation rings of length and the ramification indices having perfect residue fields of characteristic . Furthermore, in the tamely ramified case, we show that a subcategory of this category of valued hyperfields is equivalent to the category of complete discrete valued rings of mixed characteristic having perfect residue fields.
Keywords
Cite
@article{arxiv.1809.02483,
title = {Hyperfields, truncated DVRs and valued fields},
author = {Junguk Lee},
journal= {arXiv preprint arXiv:1809.02483},
year = {2018}
}
Comments
26 pages, no figures