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Hauptverfasser: Kuo, Wen-Chi, Musara, Nigel, Watson, Bruce A.
Format: Preprint
Veröffentlicht: 2026
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2605.29660
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author Kuo, Wen-Chi
Musara, Nigel
Watson, Bruce A.
author_facet Kuo, Wen-Chi
Musara, Nigel
Watson, Bruce A.
contents Martingales, Markov processes and Laws of Large Numbers have been well studied in the Riesz space (vector lattice) setting. There has, however, been no attention given in the Riesz space setting to Laws of Small Numbers or to the so called Stein-Chen method. Here we adapt the Stein-Chen method to the Riesz space setting and hence give a conditional Laws of Small Numbers for Bernoulli processes in Riesz spaces. This requires extensive use of functional calculus and the associated f-algebra structure.
format Preprint
id arxiv_https___arxiv_org_abs_2605_29660
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle The Stein-Chen method and a Law of Small Numbers in Riesz Spaces
Kuo, Wen-Chi
Musara, Nigel
Watson, Bruce A.
Functional Analysis
Probability
46A40, 47A60, 60F05
Martingales, Markov processes and Laws of Large Numbers have been well studied in the Riesz space (vector lattice) setting. There has, however, been no attention given in the Riesz space setting to Laws of Small Numbers or to the so called Stein-Chen method. Here we adapt the Stein-Chen method to the Riesz space setting and hence give a conditional Laws of Small Numbers for Bernoulli processes in Riesz spaces. This requires extensive use of functional calculus and the associated f-algebra structure.
title The Stein-Chen method and a Law of Small Numbers in Riesz Spaces
topic Functional Analysis
Probability
46A40, 47A60, 60F05
url https://arxiv.org/abs/2605.29660