On vector measures with values in ∞

Abstract

We study some aspects of countably additive vector measures with values in ∞ and the Banach lattices of real-valued functions that are integrable with respect to such a vector measure. On the one hand, we prove that if W ⊂eq ∞* is a total set not containing sets equivalent to the canonical basis of 1(c), then there is a non-countably additive ∞-valued map defined on a σ-algebra such that the composition x* is countably additive for every x*∈ W. On the other hand, we show that a Banach lattice E is separable whenever it admits a countable positively norming set and both E and E* are order continuous. As a consequence, if is a countably additive vector measure defined on a σ-algebra and taking values in a separable Banach space, then the space L1() is separable whenever L1()* is order continuous.