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High Quality Content by WIKIPEDIA articles! In mathematics, a Radon space, named after Johann Radon, is a separable metric space (M, d) such that every Borel probability measure on M is inner regular. Since a probability measure is globally finite, and hence a locally finite measure, every probability measure on a Radon space is also a Radon measure. Johann Karl August Radon (December 16, 1887 May 25, 1956) was an Austrian mathematician. His doctoral dissertation was on calculus of variations (in 1910, at the University of Vienna). Radon was born in D ín, Bohemia, Austria-Hungary, now Czech Republic. He got his doctor's degree at the University of Vienna in 1910. He spent the winter semester 1910/11 at the University of Göttingen, then he was an assistant at the Deutsche Technische Hochschule Brünn (Brno), and from 1912 to 1919 at the Technical University of Vienna. In 1913/14, he passed his habilitation at the University of Vienna.