DocumentCode
3264096
Title
On the Consistency of Bayesian Variable Selection for High Dimensional Linear Models
Author
Wang, Shuyun ; Luan, Yihui
Author_Institution
Sch. of Math., Shandong Univ., Jinan, China
Volume
2
fYear
2009
fDate
6-7 June 2009
Firstpage
211
Lastpage
214
Abstract
First, good performance of Bayesian variable selection (BVS for short) in a variety of applications is introduced. Then, we will give a theoretical explanation why BVS works so well in linear models. We assume the true regression coefficients vector of the linear model is sparsity, in a sense that some regression coefficients are bounded from zero while the rest are exactly zero. In this case, under some conditions, BVS will show it can select the true model by means of giving a consistent estimate of the true regression coefficients vector.
Keywords
Bayes methods; regression analysis; Bayesian variable selection; linear models; regression coefficients vector; Bayesian methods; Computational intelligence; Data analysis; Data mining; High performance computing; Input variables; Mathematical model; Mathematics; Statistics; Vectors; Bayesian variable selection; asymptotic consistency; linear models; posterior estimate; sparsity;
fLanguage
English
Publisher
ieee
Conference_Titel
Computational Intelligence and Natural Computing, 2009. CINC '09. International Conference on
Conference_Location
Wuhan
Print_ISBN
978-0-7695-3645-3
Type
conf
DOI
10.1109/CINC.2009.189
Filename
5231005
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