On all numbers great and small (Topological fields of Conway's numbers and their completions)

Abstract

The proper Class No of all Conway's numbers l3 is considered as a region of investigation. It turns out to be a total ordered Field (i.e., a field whose domain is a proper Class) and this totally, or linear ordered Class, containing the real numbers R and the ordinal numbers On. For any subfield F of No, i.e., F is a set nor proper class, considered with topology induced by a linear ordering on F a completion F is constructed; in particular, for ζ=ωωμ, 0≤μ<, and for a specially defined subfield F= Pζ⊂ No a complete subfield Rζ⊂ No is defined as Pζ. Fundamental (Cauchy) sequences (xα)0≤α<ζ are considered in a subfield F⊂ Pζ⊂ No, where ζ is the smallest ordinal number which does not belong to F, and they are the main instrument in the paper. A fragment of Mathematical Analysis in Rζ is given and two of its non-trivial results are presented: every positive number x∈ Rζ has a unique n-th root in Rζ, for each positive integer n and every odd-degree polynomial with coefficients in Rζ has a root in Rζ. Hence so-called fundamental theorem of algebra: the ring Rζ[i]def= Cζ of all numbers of the form x+iy (x,y∈ Rζ), i2=-1, is an algebraically closed field.