数学物理学报(英文版) ›› 2012, Vol. 32 ›› Issue (2): 735-744.doi: 10.1016/S0252-9602(12)60053-8

• 论文 • 上一篇    下一篇

CONVERGENCE OF WEIGHTED AVERAGES OF MARTINGALES IN NONCOMMUTATIVE BANACH FUNCTION SPACES

张超1,2|侯友良1   

  1. 1. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China
    2. Departamento de Matem´aticas, Facultad de Ciencias, Universidad Aut´onoma de Madrid, Madrid 28049, Spain
  • 收稿日期:2010-10-02 修回日期:2011-03-14 出版日期:2012-03-20 发布日期:2012-03-20
  • 基金资助:

    This research was supported by the National Natural Science Foundation of China (11071190).

CONVERGENCE OF WEIGHTED AVERAGES OF MARTINGALES IN NONCOMMUTATIVE BANACH FUNCTION SPACES

 ZHANG Chao1,2, HOU You-Liang1   

  1. 1. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China
    2. Departamento de Matem´aticas, Facultad de Ciencias, Universidad Aut´onoma de Madrid, Madrid 28049, Spain
  • Received:2010-10-02 Revised:2011-03-14 Online:2012-03-20 Published:2012-03-20
  • Supported by:

    This research was supported by the National Natural Science Foundation of China (11071190).

PDF (PC)

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摘要:

Let x = (xn)n≥1 be a martingale on a noncommutative probability space (Mτ ) and (wn)n≥1 a sequence of positive numbers such that Wn =
nk=1 wk →∞ as n →1. We prove that x = (xn)n≥1 converges in E(M) if and only if (σn(x))n≥1 converges in E(M), where E(M) is a noncommutative rearrangement invariant Banach function space with the Fatou property and σn(x) is given by
σn(x) =1/Wnnk=1wkxk, n = 1, 2, · · · . If in addition, E(M) has absolutely continuous norm, then, (σn(x))n≥1 converges in E(M) if and only if x = (xn)n≥1 is uniformly integrable and its limit in measure topology x ∈E(M).

关键词: Weighted average, noncommutative martingales, noncommutative Banach function spaces, uniform integrability

Abstract:

Let x = (xn)n≥1 be a martingale on a noncommutative probability space (Mτ ) and (wn)n≥1 a sequence of positive numbers such that Wn =
nk=1 wk →∞ as n →1. We prove that x = (xn)n≥1 converges in E(M) if and only if (σn(x))n≥1 converges in E(M), where E(M) is a noncommutative rearrangement invariant Banach function space with the Fatou property and σn(x) is given by
σn(x) =1/Wnnk=1wkxk, n = 1, 2, · · · . If in addition, E(M) has absolutely continuous norm, then, (σn(x))n≥1 converges in E(M) if and only if x = (xn)n≥1 is uniformly integrable and its limit in measure topology x ∈E(M).

Key words: Weighted average, noncommutative martingales, noncommutative Banach function spaces, uniform integrability

中图分类号: 

  • 46L52
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