Spaces of measurable functions

Abstract

For a metrizable space X and a finite measure space (,M,μ) let Mμ(X) and Mfμ(X) be the spaces of all equivalence classes (under the relation of equality almost everywhere mod μ) of mathfrakM-measurable functions from to X whose images are separable and finite, respectively, equipped with the topology of convergence in measure. The main aim of the paper is to prove the following result: if μ is (nonzero and) nonatomic and X has more than one point, then the space Mμ(X) is a noncompact absolute retract and Mfμ(A) is homotopy dense in Mμ(X) for each dense subset A of X. In particular, if X is completely metrizable, then Mμ(X) is homeomorphic to an infinite-dimensional Hilbert space.