Measure finite topology on the ring of measurable functions

Abstract

Let M(X,A,μ) be the ring of all real-valued measurable functions constructed over a measure space (X,A,μ). A topology on M(X,A,μ), called the Fμ-topology weaker than the Uμ-topology is introduced. It is realized that the component, the quasi component and the path component in this Fμ-topology are identical. It turns out that the Fμ-topology on M(X,A,μ) becomes connected if and only if it is path connected if and only if μ is an atomic measure of a special type. It is also proved that the Fμ-topology is first countable when and only when μ is a hemifinite measure. Finally, it is shown that the second countability of the Fμ-topology is equivalent to the hemifiniteness of the measure μ together with the countable chain condition of the Fμ-topology.

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