À propos de cet article
Publié en ligne: 24 août 2018
Pages: 99 - 131
Reçu: 08 sept. 2016
Accepté: 31 déc. 2017
DOI: https://doi.org/10.1515/amsil-2017-0017
Mots clés
© 2018 Ron Brown, published by Sciendo
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 License.
The space M(ℝ (x; y)) of real places on ℝ (x; y) is shown to be path-connected. The possible value groups of these real places are determined and for each one it is shown that the set of real places with that value group is dense in the space. Large collections of subspaces of the space M(ℝ (x; y)) are constructed such that any two members of such a collection are homeomorphic. A key tool is a homeomorphism between the space of real places on ℝ((x))(y) and a certain space of sequences related to the “signatures” of [2], which themselves are shown here to be related to the “strict systems of polynomial extensions” of [3].