A formal construction of the spacetime manifold

Journal of Philosophical Logic 37 (5):441 - 478 (2008)
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Abstract

The spacetime manifold, the stage on which physics is played, is constructed ab initio in a formal program that resembles the logicist reconstruction of mathematics. Zermelo’s set theory extended by urelemente serves as a framework, to which physically interpretable proper axioms are added. From this basis, a topology and subsequently a Hausdorff manifold are readily constructed which bear the properties of the known spacetime manifold. The present approach takes worldlines rather than spacetime points to be primitive, having them represented by urelemente. Thereby it is demonstrated that an important part of physics is formally reducible to set theory.

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10.1007/s10992-007-9075-x

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Citations of this work

Linear structures, causal sets and topology.Hudetz Laurenz - 2015 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 52 (Part B):294-308.
Linear structures, causal sets and topology.Laurenz Hudetz - 2015 - Studies in the History and Philosophy of Modern Physics.

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References found in this work

Geometry of time and space.Alfred Arthur Robb - 1936 - Cambridge [Eng.]: University Press.
The elementary foundations of spacetime.James Ax - 1978 - Foundations of Physics 8 (7-8):507-546.
Is mathematical rigor necessary in physics?Kevin Davey - 2003 - British Journal for the Philosophy of Science 54 (3):439-463.

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