Around Podewski's conjecture
Abstract
A long-standing conjecture of Podewski states that every minimal field is algebraically closed. It was proved by Wagner for fields of positive characteristic, but it remains wide open in the zero-characteristic case. We reduce Podewski's conjecture to the case of fields having a definable (in the pure field structure), well partial order with an infinite chain, and we conjecture that such fields do not exist. Then we support this conjecture by showing that there is no minimal field interpreting a linear order in a specific way; in our terminology, there is no almost linear, minimal field. On the other hand, we give an example of an almost linear, minimal group of exponent 2, and we show that each almost linear, minimal group is elementary abelian of prime exponent. On the other hand, we give an example of an almost linear, minimal group of exponent 2, and we show that each almost linear, minimal group is torsion.
Keywords
Cite
@article{arxiv.1201.5709,
title = {Around Podewski's conjecture},
author = {Krzysztof Krupiński and Predrag Tanović and Frank O. Wagner},
journal= {arXiv preprint arXiv:1201.5709},
year = {2013}
}
Comments
16 pages