Infima and cardinal characteristics of critical ideals for countable compact spaces

Abstract

For each countable ordinal α 2, the ideals convα were introduced in ``Critical ideals for countable compact spaces'' (to appear in Fund. Math., see also arXiv:2503.12571) to characterize compact countable spaces homeomorphic to ωα · n+1 with the order topology. We study the structure of these ideals in the Katetov order, namely for limit ordinals α, we show that convα do not serve as greatest lower bounds of the convβ for β<α. We therefore define the ideals conv<α with this property and show that together, the ideals convα and conv<α form intertwined decreasing hierarchies of 04- and 05-complete ideals. Furthermore, we examine several cardinal invariants of convα, computing invariants that have recently appeared in the literature in various contexts.