NONCONCAVE PENALIZED COMPOSITE CONDITIONAL LIKELIHOOD ESTIMATION OF SPARSE ISING MODELS
成果类型:
Article
署名作者:
Xue, Lingzhou; Zou, Hui; Cai, Tianxi
署名单位:
University of Minnesota System; University of Minnesota Twin Cities; Harvard University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/12-AOS1017
发表日期:
2012
页码:
1403-1429
关键词:
virus type-1 protease
variable selection
mutation patterns
resistance
regression
Lasso
regularization
variants
摘要:
The Ising model is a useful tool for studying complex interactions within a system. The estimation of such a model, however, is rather challenging, especially in the presence of high-dimensional parameters. In this work, we propose efficient procedures for learning a sparse Ising model based on a penalized composite conditional likelihood with nonconcave penalties. Nonconcave penalized likelihood estimation has received a lot of attention in recent years. However, such an approach is computationally prohibitive under high-dimensional Ising models. To overcome such difficulties, we extend the methodology and theory of nonconcave penalized likelihood to penalized composite conditional likelihood estimation. The proposed method can be efficiently implemented by taking advantage of coordinate-ascent and minorization-maximization principles. Asymptotic oracle properties of the proposed method are established with NP-dimensionality. Optimality of the computed local solution is discussed. We demonstrate its finite sample performance via simulation studies and further illustrate our proposal by studying the Human Immunodeficiency Virus type 1 protease structure based on data from the Stanford HIV drug resistance database. Our statistical learning results match the known biological findings very well, although no prior biological information is used in the data analysis procedure.