σ-Ideals and outer measures on the real line

Abstract

A weak selection on R is a function f: [R]2 R such that f(\x,y\) ∈ \x,y\ for each \x,y\ ∈ [R]2. In this article, we continue with the study (which was initiated in ag) of the outer measures λf on the real line R defined by weak selections f. One of the main results is to show that CH is equivalent to the existence of a weak selection f for which: \[ λf(A)= cases 0 & if |A| ≤ ω,\\ ∞ & otherwise. cases \] Some conditions are given for a σ-ideal of R in order to be exactly the family Nf of λf-null subsets for some weak selection f. It is shown that there are 2c pairwise distinct ideals on R of the form Nf, where f is a weak selection. Also we prove that Martin Axiom implies the existence of a weak selection f such that Nf is exactly the σ-ideal of meager subsets of R. Finally, we shall study pairs of weak selections which are "almost equal" but they have different families of λf-measurable sets.