Two inequalities between cardinal invariants

Abstract

We prove two ZFC inequalities between cardinal invariants. The first inequality involves cardinal invariants associated with an analytic P-ideal, in particular the ideal of subsets of ω of asymptotic density 0. We obtain an upper bound on the -covering number, sometimes also called the weak covering number, of this ideal by proving in Section sec:covz0 that cov(Z0) ≤ d. In Section sec:skbk we investigate the relationship between the bounding and splitting numbers at regular uncountable cardinals. We prove in sharp contrast to the case when = ω, that if is any regular uncountable cardinal, then s ≤ b.