Inductive limits of ideals
Abstract
G. Debs and J. Saint Raymond in 2009 defined the Borel separation rank of an analytic ideal () as minimal ordinal such that there is with and , where is the filter dual to the ideal (actually, the authors use the dual notion of filters instead of ideals). Moreover, they introduced ideals , for all , and conjectured that if and only if contains an isomorphic copy of (). To define in the case of limit ordinals , G. Debs and J. Saint Raymond introduced inductive limits of ideals. We show that the above conjecture is false in the case of by constructing an ideal of rank such that . However, we show that is equivalent to . We discuss (indicated by the above result) possible modification of the original conjecture for limit ordinals.
Keywords
Cite
@article{arxiv.2103.17169,
title = {Inductive limits of ideals},
author = {Adam Kwela},
journal= {arXiv preprint arXiv:2103.17169},
year = {2025}
}