Two Cardinal Inequalities about Bidiscrete Systems
Functional Analysis
2016-05-13 v1
Abstract
We consider the cardinal invariant defined by M. D\v{z}amonja and I. Juh\'asz concerning bidiscrete systems. Using the relation between bidiscrete systems and irredundance for a compact Hausdorff space , we prove that , generalizing a result of S. Todorcevic concerning the irredundance in Boolean algebras and we prove that for every maximal irredundant family , there is a -base for with , a result analogous to the McKenzie Theorem for Boolean algebras in the context of compact spaces. In particular, it is a consequence of the latter result that for every compact Hausdorff space . From the relation between bidiscrete systems and biorthogonal systems, we obtain some results about biorthogonal systems in Banach spaces of the form .
Cite
@article{arxiv.1605.03708,
title = {Two Cardinal Inequalities about Bidiscrete Systems},
author = {Clayton Suguio Hida},
journal= {arXiv preprint arXiv:1605.03708},
year = {2016}
}