TY - JOUR
T1 - Level-specific correction for nonparametric likelihoods
AU - Liu, Yukun
AU - Chen, Jiahua
AU - Li, Ting
PY - 2014/7
Y1 - 2014/7
N2 - The popular empirical likelihood method not only has a convenient chi-square limiting distribution but is also Bartlett correctable, leading to a high-order coverage precision of the resulting confidence regions. Meanwhile, it is one of many nonparametric likelihoods in the Cressie-Read power divergence family. The other likelihoods share many attractive properties but are not Bartlett correctable. In this paper, we develop a new technique to achieve the effect of being Bartlett correctable. Our technique is generally applicable to pivotal quantities with chi-square limiting distributions. Numerical experiments and an example reveal that the method is successful for several important nonparametric likelihoods.
AB - The popular empirical likelihood method not only has a convenient chi-square limiting distribution but is also Bartlett correctable, leading to a high-order coverage precision of the resulting confidence regions. Meanwhile, it is one of many nonparametric likelihoods in the Cressie-Read power divergence family. The other likelihoods share many attractive properties but are not Bartlett correctable. In this paper, we develop a new technique to achieve the effect of being Bartlett correctable. Our technique is generally applicable to pivotal quantities with chi-square limiting distributions. Numerical experiments and an example reveal that the method is successful for several important nonparametric likelihoods.
KW - Bartlett correction
KW - Euclidean likelihood
KW - empirical likelihood
KW - exponential tilting likelihood
KW - power divergence family
UR - https://www.scopus.com/pages/publications/84904685852
U2 - 10.1080/10485252.2014.929676
DO - 10.1080/10485252.2014.929676
M3 - 文章
AN - SCOPUS:84904685852
SN - 1048-5252
VL - 26
SP - 433
EP - 449
JO - Journal of Nonparametric Statistics
JF - Journal of Nonparametric Statistics
IS - 3
ER -