English

Hyperfields, truncated DVRs and valued fields

Commutative Algebra 2018-09-10 v1 Logic Number Theory

Abstract

For any two complete discrete valued fields K1K_1 and K2K_2 of mixed characteristic with perfect residue fields, we show that if the nn-th valued hyperfields of K1K_1 and K2K_2 are isomorphic over pp for each n1n\ge1, then K1K_1 and K2K_2 are isomorphic. More generally, for n1,n21n_1,n_2\ge 1, if n2n_2 is large enough, then any homomorphism, which is over pp, from the n1n_1-th valued hyperfield of K1K_1 to the n2n_2-th valued hyperfield of K2K_2 can be lifted to a homomorphism from K1K_1 to K2K_2. We compute such n2n_2 effectively, which depends only on the ramification indices of K1K_1 and K2K_2. Moreover, if K1K_1 is tamely ramified, then any homomorphism over pp 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 pp and a positive integer ee and for large enough nn, we show that a certain category of valued hyperfields is equivalent to the category of truncated discrete valuation rings of length nn and the ramification indices ee having perfect residue fields of characteristic pp. 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 (0,p)(0,p) 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

R2 v1 2026-06-23T03:58:00.247Z