von Neumann’s mean ergodic theorem on complete random inner product modules

Xia ZHANG; Tiexin GUO

doi:10.1007/s11464-011-0139-4

PDF(174 KB)

Front. Math. China ›› 2011, Vol. 6 ›› Issue (5) : 965-985. DOI: 10.1007/s11464-011-0139-4

RESEARCH ARTICLE

von Neumann’s mean ergodic theorem on complete random inner product modules

Xia ZHANG ,
Tiexin GUO

Author information +

History +

Abstract

We first prove two forms of von Neumann’s mean ergodic theorems under the framework of complete random inner product modules. As applications, we obtain two conditional mean ergodic convergence theorems for random isometric operators which are defined on $L ℱ p (ℰ, H)$ and generated by measure-preserving transformations on Ω, where H is a Hilbert space, $L p (ℰ, H)$ (1≤p<∞) the Banach space of equivalence classes of H-valued p-integrable random variables defined on a probability space (Ω, $ℰ$ , P), $ℱ$ a sub σ-algebra of $ℰ$ , and $L ℱ p (ℰ, H)$ the complete random normed module generated by $L p (ℰ, H)$ .

Keywords

Random inner product module / random normed module / random unitary operator / random contraction operator / von Neumann’s mean ergodic theorem

Cite this article

EndNote

Ris (Procite)

Bibtex

Download citation ▾

Xia ZHANG, Tiexin GUO. von Neumann’s mean ergodic theorem on complete random inner product modules. Front Math Chin, 2011, 6(5): 965‒985 https://doi.org/10.1007/s11464-011-0139-4

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Albanese A A, Bonet J, Ricker W J. C₀-semigroups and mean ergodic operators in a class of Fréchet spaces. J Math Anal Appl, 2010, 365: 142-157 CrossRef Google scholar

[2]	Beck A, Schwartz J T. A vector-valued random ergodic theorem. Proc Am Math Soc, 1957, 8: 1049-1059 CrossRef Google scholar

[3]	Chen P D. The theory of random measures. Acta Math Sinica, 1976, 19: 210-216 (in Chinese)

[4]	Dunford N, Schwartz J T. Linear Operators (I). New York: Interscience, 1957

[5]	Filipović D, Kupper M, Vogelpoth N. Separation and duality in locally L⁰-convex modules. J Funct Anal, 2009, 256: 3996-4029 CrossRef Google scholar

[6]	Fonf V P, Lin M, Wojtaszczyk P. Ergodic characterizations of reflexivity of Banach spaces. J Funct Anal, 2001, 187: 146-162 CrossRef Google scholar

[7]	Guo T X. Extension theorems of continuous random linear operators on random domains. J Math Anal Appl, 1995, 193: 15-27 CrossRef Google scholar

[8]	Guo T X. The Radon-Nikodým property of conjugate spaces and the w^∗-equivalence theorem for w^∗-measurable functions. Sci China Ser A, 1996, 39: 1034-1041

[9]	Guo T X. Module homomorphisms on random normed modules. Chinese Northeastern Math J, 1996, 12: 102-114

[10]	Guo T X. Some basic theories of random normed linear spaces and random inner product spaces. Acta Anal Funct Appl, 1999, 1: 160-184

[11]	Guo T X. The relation of Banach-Alaoglu theorem and Banach-Bourbaki-Kakutani-Šmulian theorem in complete random normed modules to stratification structure. Sci China Ser A, 2008, 51: 1651-1663 CrossRef Google scholar

[12]	Guo T X. Relations between some basic results derived from two kinds of topologies for a random locally convex module. J Funct Anal, 2010, 258: 3024-3047 CrossRef Google scholar

[13]	Guo T X. Recent progress in random metric theory and its applications to conditional risk measures. Sci China Ser A, 2011, 54(4): 633-660 CrossRef Google scholar

[14]	Guo T X. The theory of module homomorphisms in complete random inner product modules and its applications to Skorohod’s random operator theory. Preprint

[15]	Guo T X, Li S B. The James theorem in complete random normed modules. J Math Anal Appl, 2005, 308: 257-265 CrossRef Google scholar

[16]	Guo T X, Shi G. The algebraic structure of finitely generated L0(ℱ,K)-mod⁡ules and the Helly theorem in random normed modules. J Math Anal Appl, 2011, 381: 833-842 CrossRef Google scholar

[17]	Guo T X, Xiao H X, Chen X X. A basic strict separation theorem in random locally convex modules. Nolinear Anal: TMA, 2009, 71: 3794-3804 CrossRef Google scholar

[18]	Guo T X, You Z Y. The Riesz’s representation theorem in complete random inner product modules and its applications. Chin Ann of Math, Ser A, 1996, 17: 361-364 (in Chinese)

[19]	Guo T X, Zeng X L. Random strict convexity and random uniform convexity in random normed modules. Nonlinear Anal, 2010, 73: 1239-1263 CrossRef Google scholar

[20]	Guo T X, Zhang X. Stone’s representation theorem on complete complex random inner product modules. Preprint

[21]	Petersen K. Ergodic Theory. Cambridge Studies in Advanced Mathematics 2. London-New York-New Rochelle-Melbourne-Sydney: Cambridge University Press, 1983

[22]	von Neumann J. Proof of the quasi-ergodic hypothesis. Proc Nat Acad Sci, 1932, 18: 70-82 CrossRef Google scholar

[23]	Yosida K, Kakutani S. Operator theoretical treatment of Markoff’s process and the mean ergodic theorem. Ann of Math, 1941, 42: 188-228 CrossRef Google scholar