CSpace
convolutiontheoremandasymptoticefficiencyintwosidetruncateddistributionfamilythenormalcase
Song Weixing1; Cheng Ping2
2002
Source Publicationjournalofsystemsscienceandcomplexity
ISSN1009-6124
Volume015Issue:003Pages:315
AbstractIn the distribution family with common support and the one side truncated distribution family,Bickle,I.A.Ibragimov and R.Z.Hasminskii proved two important convolution theorems.As to the two-side truncated case,we also proved a convolution theorem,which plays an extraordinary role in the efficency theory.In this paper,we will study another kind of two-side truncated distribution family,and prove a convolution result with normal form.On the basis of this convolution result,a new kind of efficiency concept is given;meanwhile,we will show that MLE is an efficient estimate in this distribution family.
Language英语
Document Type期刊论文
Identifierhttp://ir.amss.ac.cn/handle/2S8OKBNM/37803
Collection中国科学院数学与系统科学研究院
Affiliation1.北京师范大学
2.中国科学院数学与系统科学研究院
Recommended Citation
GB/T 7714
Song Weixing,Cheng Ping. convolutiontheoremandasymptoticefficiencyintwosidetruncateddistributionfamilythenormalcase[J]. journalofsystemsscienceandcomplexity,2002,015(003):315.
APA Song Weixing,&Cheng Ping.(2002).convolutiontheoremandasymptoticefficiencyintwosidetruncateddistributionfamilythenormalcase.journalofsystemsscienceandcomplexity,015(003),315.
MLA Song Weixing,et al."convolutiontheoremandasymptoticefficiencyintwosidetruncateddistributionfamilythenormalcase".journalofsystemsscienceandcomplexity 015.003(2002):315.
Files in This Item:
There are no files associated with this item.
Related Services
Recommend this item
Bookmark
Usage statistics
Export to Endnote
Google Scholar
Similar articles in Google Scholar
[Song Weixing]'s Articles
[Cheng Ping]'s Articles
Baidu academic
Similar articles in Baidu academic
[Song Weixing]'s Articles
[Cheng Ping]'s Articles
Bing Scholar
Similar articles in Bing Scholar
[Song Weixing]'s Articles
[Cheng Ping]'s Articles
Terms of Use
No data!
Social Bookmark/Share
All comments (0)
No comment.
 

Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.