Spaces of regular abstract martingales

Troitsky, Vladimir G.; Xanthos, Foivos

doi:10.1016/j.jmaa.2015.09.082

Cited by 3 publications

(1 citation statement)

References 17 publications

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“…Schaefer [17], Stoica [18,19] and Troitsky [21] considered the extension of the concepts of conditional expectation and martingales to Banach lattices. See [7,20,22] for some recent developments in this area. In 2004, Kuo, Labuschagne and Watson [9] generalized these concepts to vector lattices (Riesz spaces).…”

Section: Introductionmentioning

confidence: 99%

Near-epoch dependence in Riesz spaces

Kuo

Rogans

Watson

2018

Journal of Mathematical Analysis and Applications

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The abstraction of the study of stochastic processes to Banach lattices and vector lattices has received much attention by Grobler, Kuo, Labuschagne, Stoica, Troitsky and Watson over the past fifteen years. By contrast mixing processes have received very little attention. In particular mixingales were generalized to the Riesz space setting in W.-C. Kuo, J.J. Vardy, B.A. Watson, Mixingales on Riesz spaces, J. Math. Anal. Appl., 402 (2013), 731-738. The concepts of strong and uniform mixing as well as related mixing inequalities were extended to this setting in W.-C. Kuo, M.J. Rogans, B.A. Watson, Mixing inequalities in Riesz spaces, J. Math. Anal. Appl., 456 (2017), 992-1004.In the present work we formulate the concept of near-epoch dependence for Riesz space processes and show that if a process is near-epoch dependent and either strong or uniform mixing then the process is a mixingale, giving access to a law of large numbers. The above is applied to autoregessive processes of order 1 in Riesz spaces. *

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Section: Introductionmentioning

confidence: 99%

Near-epoch dependence in Riesz spaces

Kuo

Rogans

Watson

2018

Journal of Mathematical Analysis and Applications

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Induced actions of B-Volterra operators on regular bounded martingale spaces

Erkurşun-Özcan

Gezer

2021

Indagationes Mathematicae

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Mixing inequalities in Riesz spaces

Kuo

Rogans

Watson

2017

Journal of Mathematical Analysis and Applications

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Various topics in stochastic processes have been considered in the abstract setting of Riesz spaces, for example martingales, martingale convergence, ergodic theory, AMARTS, Markov processes and mixingales. Here we continue the relaxation of conditional independence begun in the study of mixingales and study mixing processes. The two mixing coefficients which will be considered are the α (strong) and ϕ (uniform) mixing coefficients. We conclude with mixing inequalities for these types of processes. In order to facilitate this development, the study of generalized L 1 and L ∞ spaces begun by Kuo, Labuschagne and Watson will be extended. *

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Spaces of regular abstract martingales

Cited by 3 publications

References 17 publications

Near-epoch dependence in Riesz spaces

Near-epoch dependence in Riesz spaces

Induced actions of B-Volterra operators on regular bounded martingale spaces

Mixing inequalities in Riesz spaces

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