B-值广义泛函值函数的Bochner-Wick积分  被引量:2

Bochner-Wick integrals of functions valued in B-valued generalized functionals

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作  者:陈金淑[1] 

机构地区:[1]兰州理工大学理学院,甘肃兰州730050

出  处:《兰州理工大学学报》2012年第4期136-139,共4页Journal of Lanzhou University of Technology

摘  要:借助于Banach空间值白噪声广义泛函与经典白噪声广义泛函的Wick积分运算,定义Banach空间值白噪声广义泛函值函数关于白噪声广义泛函值测度的一种积分—Bochner-Wick积分,讨论这种积分的性质,建立相应的收敛定理.With the help of Wick's integrational operation of Banaeh space-valued generalized functionals of white noise and classical generalized functions of white noise, an integral called Bochner-Wick integral of a function valued in B-valued generalized functionals with respect to a measure which takes value in the space of generalized functionals was defined, its property was discussed, and corresponding convergence theorems were established.

关 键 词:白噪声分析 Banach空间值广义泛函 Bochner-Wick积分 

分 类 号:O211.6[理学—概率论与数理统计]

 

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