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RESEARCH PRODUCT
Sets versus trial sequences, Hausdorff versus von Mises: “Pure” mathematics prevails in the foundations of probability around 1920
Reinhard Siegmund-schultzesubject
Mathematics(all)HistoryPure mathematicsSequenceTheory of probabilityGeneral MathematicsHausdorff spaceApplied mathematicsMeasure (mathematics)Probability theoryCalculusMeasure theoryvon Mises yield criterionOrder (group theory)Countable setvon Mises’s KollektivsMathematicsBernstein–von Mises theoremdescription
Abstract The paper discusses the tension which occurred between the notions of set (with measure) and (trial-) sequence (or—to a certain degree—between nondenumerable and denumerable sets) when used in the foundations of probability theory around 1920. The main mathematical point was the logical need for measures in order to describe general nondiscrete distributions, which had been tentatively introduced before (1919) based on von Mises’s notion of the “Kollektiv.” In the background there was a tension between the standpoints of pure mathematics and “real world probability” (in the words of J.L. Doob) at the time. The discussion and publication in English translation (in Appendix ) of two critical letters of November 1919 by the “pure” mathematician Felix Hausdorff to the engineer and applied mathematician Richard von Mises compose about one third of the paper. The article also investigates von Mises’s ill-conceived effort to adopt measures and his misinterpretation of an influential book of Constantin Caratheodory. A short and sketchy look at the subsequent development of the standpoints of the pure and the applied mathematician—here represented by Hausdorff and von Mises—in the probability theory of the 1920s and 1930s concludes the paper.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2010-05-01 | Historia Mathematica |