English

Some arithmetic properties on nonstandard rationals

Logic 2016-01-19 v4 Number Theory

Abstract

For a given number field KK, we show that the ranks of nonsingular elliptic curves over KK are uniformly finitely bounded if and only if weak Mordell-Weil property holds in all(some) ultrpowers K^*K of KK. Also we introduce Nonstandard Mordell-Weil property for K^*K considering each Mordell-Weil group as Z^*Z-module, where Z^*Z is an ultrapower of ZZ, and we show that Nonstandard Mordell-Weil property is equivalent to weak Mordell-Weil property in K^*K. In Appendix, we showed that it is possible to consider definable abelian groups as Z^*Z-modules in a saturated nonstandard rational number field Q^*Q so that nonstandard Mordell-Weil property is well-defined, and thus we showed that nonstandard Mordell-Weil property and weak Mordell-Weil property are equivalent. Next we focus on priems and prime ideals of nonstandard raional number fields. We give an infinite factorization theorem on Q^*Q using valuations induced from primes of Z^*Z, and we classify maximal and prime ideal of Z^*Z in terms of maximal filter on the set of primes of Z^*Z and ordered semigroups of the valuation semigroup induced from maximal ideals of Z^*Z.

Keywords

Cite

@article{arxiv.1509.06474,
  title  = {Some arithmetic properties on nonstandard rationals},
  author = {Junguk Lee},
  journal= {arXiv preprint arXiv:1509.06474},
  year   = {2016}
}

Comments

13 pages, no figures

R2 v1 2026-06-22T11:02:23.332Z