On the topological structure of the Hahn field and convergence of power series

Autor: Flynn, Darren, Shamseddine, Khodr
Rok vydání: 2019
Předmět:
Druh dokumentu: Working Paper
Popis: In this paper, we study the topological structure of the Hahn field whose elements are functions from the additive abelian group of rational numbers to the real numbers field, with well-ordered support. After reviewing the algebraic and order structures of the Hahn field, we introduce different vector topologies that are induced by families of semi-norms and all of which are weaker than the order or valuation topology. We compare those vector topologies and we identify the weakest one whose properties are similar to those of the weak topology on the Levi-Civita field. In particular, we state and prove a convergence criterion for power series that is similar to that for power series on the Levi-Civita field in its weak topology
Databáze: arXiv