A Characterization of the Vector Lattice of Measurable Functions

Abstract

Given a probability measure space (X,,μ), it is well known that the Riesz space L0(μ) of equivalence classes of measurable functions f: X R is universally complete and the constant function 1 is a weak order unit. Moreover, the linear functional L∞(μ) R defined by f ∫ f\,dμ is strictly positive and order continuous. Here we show, in particular, that the converse holds true, i.e., any universally complete Riesz space E with a weak order unit e>0 which admits a strictly positive order continuous linear functional on the principal ideal generated by e is lattice isomorphic onto L0(μ), for some probability measure space (X,,μ).