Algebraic structures on non-Archimedean Urysohn universal metric spaces
Abstract
We investigate valued-field structures on Urysohn universal ultrametric spaces. We introduce p-adic Levi--Civita fields as subfields of p-adic Hahn fields and treat them together with ordinary Levi--Civita fields. For a subgroup G of R containing Z and a countably infinite perfect field k, the corresponding Levi--Civita valued field is isometric to the R-Urysohn universal ultrametric space, where R=\0\\η-g g∈ G\. Thus these spaces admit field structures extending prescribed prime valued fields, including Q with the trivial valuation and the p-adic fields Qp. We also prove that complete valued fields with infinite residue fields are haloed, and hence universal for separable ultrametric spaces with corresponding distance sets. In the separable case, such a valued field is itself isometric to the corresponding Urysohn space. Examples include Cp, the completion of the maximal unramified extension of Qp, Laurent series fields, and completions of their algebraic closures. Finally, for a countably infinite perfect residue field, the corresponding full Hahn-type valued field is a Urysohn universal ultrametric space exactly when its value group is order-isomorphic to Z.
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