English

An approach to non-standard analysis

General Mathematics 2009-10-12 v4 Logic

Abstract

This note has two principal aims: to portray an essence of Non-Standard Analysis as a particular structure (which we call lim-rim), noting its interplay with the notion of ultrapower, and to present a construction of Non-Standard Analysis, viewed as a matter of mathematics, where the set *A of non-standard elements of a set A - "the adjunction of all possible limits" is a "good" kind of lim-rim which plays a role analogous to the algebraic closure of a field - "the adjunction of all roots of polynomials". In the same spirit as with algebraic closures, one has uniqueness up to isomorphism, and also universality and homogeneity, provided one has enough Generalized Continuum Hypothesis. The cardinality of *A will be just something like 2^(2^|A|), and one has a high degree of saturation.

Keywords

Cite

@article{arxiv.math/0602469,
  title  = {An approach to non-standard analysis},
  author = {Eliahu Levy},
  journal= {arXiv preprint arXiv:math/0602469},
  year   = {2009}
}

Comments

8 pages, some corrections and clarifications made. v4: correction of a misstatement about cardinalities in saturation and some small improvements of presentation