Some arithmetic properties on nonstandard rationals
Abstract
For a given number field , we show that the ranks of nonsingular elliptic curves over are uniformly finitely bounded if and only if weak Mordell-Weil property holds in all(some) ultrpowers of . Also we introduce Nonstandard Mordell-Weil property for considering each Mordell-Weil group as -module, where is an ultrapower of , and we show that Nonstandard Mordell-Weil property is equivalent to weak Mordell-Weil property in . In Appendix, we showed that it is possible to consider definable abelian groups as -modules in a saturated nonstandard rational number field 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 using valuations induced from primes of , and we classify maximal and prime ideal of in terms of maximal filter on the set of primes of and ordered semigroups of the valuation semigroup induced from maximal ideals of .
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