B 值复测度拟鞅的原子分解

数学物理学报 ›› 2009, Vol. 29 ›› Issue (3): 584-592.

B 值复测度拟鞅的原子分解

(1. 武汉大学数学与统计学院武汉 430072; |2. 新乡学院数学系河南新乡 453000)

收稿日期:2007-03-11 修回日期:2008-12-30 出版日期:2009-06-25 发布日期:2009-06-25
基金资助:
国家自然科学基金(10371093)资助

Atomic Decompositions of B -valued Quasi-martingales with Respect to Complex Measures

(1. School of Mathematics and Statistics, Wuhan University, Wuhan 430072|2. Department of Mathematics,Xinxiang University, Henan Xinxiang 453000)

Received:2007-03-11 Revised:2008-12-30 Online:2009-06-25 Published:2009-06-25
Supported by:
国家自然科学基金(10371093)资助

摘要/Abstract

摘要：

设P 是一个概率测度, ψ 是一个复值可积函数, dμ =ψdP是一个复值测度. 在权函数ψ∈a₁∩b_∝⁺ 和Banach空间X 具有适当的凸性和光滑性的条件下, 作者证明了关于复测度μ 的X 值拟鞅空间D_α(X) 和_pQ_α(X) 上的原子分解定理. 并且利用复测度拟鞅的原子分解定理, 在0<α ≤ 1 的情形, 证明了关于X 值复测度拟鞅的两个重要不等式.

关键词: 复测度, 向量值拟鞅, 原子分解

Abstract:

Let P be a probability measure, ψ a complex valued integrable function and dμ=ψdP a complex valued measure. Two theorems of atomic decompositions for the space D_α(X) and _pQ_α(X) of X-valued quasi-martingales with respect to the complex measure μ are obtained when ψ ∈a₁ ∩ b_∝⁺ and the Banach space X has suitable convexity and smoothness. As the applications of atomic decompositions two inequalities are proved for X-valued quasi-martingales respect to the complex measures μ by using atomic decompositions in the case of 0< α ≤ 1.

Key words: Complex measure, , Vector-valued quasi-martingale, , Atomic decomposition

中图分类号:

60G46

马聪变, 侯友良. B 值复测度拟鞅的原子分解[J]. 数学物理学报, 2009, 29(3): 584-592.

MA Cong-Bian, HOU You-Liang. Atomic Decompositions of B -valued Quasi-martingales with Respect to Complex Measures[J]. Acta mathematica scientia,Series A, 2009, 29(3): 584-592.