arXiv:1509.03193 Abstract | arXiv Analytics

arXiv:1509.03193 [math.LO]Abstract References Reviews Resources

Eberlein-Smulian compactness and Kolmogorov extension theorems; a model theoretic approach

Published 2015-09-10Version 1

This paper has two parts. First, we complete the proof of the Kolmogorov extension theorem for unbounded random variables using compactness theorem of integral logic which was proved for bounded case in [8]. Second, we give a proof of the Eberlein-Smulian compactness theorem by Ramsey's theorem and point out the correspondence between this theorem and a result in Shelah's classification theory.

Comments: Any comments welcome!

Categories: math.LO

Subjects: 03B48, 03C20, 03C45, 46B50

Keywords: kolmogorov extension theorem, model theoretic approach, eberlein-smulian compactness theorem, shelahs classification theory, integral logic

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arXiv:1509.03193 [math.LO]Abstract References Reviews Resources

Eberlein-Smulian compactness and Kolmogorov extension theorems; a model theoretic approach

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arXiv:1509.03193 [math.LO]AbstractReferencesReviewsResources

Eberlein-Smulian compactness and Kolmogorov extension theorems; a model theoretic approach

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arXiv:1509.03193 [math.LO]Abstract References Reviews Resources