高师理科学刊
高師理科學刊
고사이과학간
JOURNAL OF SCIENCE OF TEACHERS' COLLEGE AND UNIVERSITY
2013年
4期
1-3
,共3页
截尾变量%对偶理论%单峰分布%Khintchine变换
截尾變量%對偶理論%單峰分佈%Khintchine變換
절미변량%대우이론%단봉분포%Khintchine변환
truncated variable%dual theory%unimodal distribution%Khintchine transform
假定随机变量X 为单峰分布,众数M >,[+)X a∈?∞,.在对偶理论的基础上引入测度d 0变换,得到了三段截尾变量{max 0 X mX z?,,(其中:1m>;0z>)均值的上界.}
假定隨機變量X 為單峰分佈,衆數M >,[+)X a∈?∞,.在對偶理論的基礎上引入測度d 0變換,得到瞭三段截尾變量{max 0 X mX z?,,(其中:1m>;0z>)均值的上界.}
가정수궤변량X 위단봉분포,음수M >,[+)X a∈?∞,.재대우이론적기출상인입측도d 0변환,득도료삼단절미변량{max 0 X mX z?,,(기중:1m>;0z>)균치적상계.}
Supposed random variables X is the unimodal distribution,mode Md>0,X ∈[ ?a ∞+.Introduced the measure transformation based on the dual theory , obtained the upper bounds of mean for three-piece truncated random variables max{0,X,mX?z}, with m>1,z>0.
