[1] |
CHEN K N, GUO S J, LIN Y Y, et al. Least absolute relative error estimation [J].Journal of the American Statistical Association, 2010, 105(491): 1104-1112.
|
[2] |
ZHANG Q Z, WANG Q H. Local least absolute relative error estimating approach for partially linear multiplicative model [J]. Statistica Sinica, 2013, 23: 1091-1116.
|
[3] |
ZHANG T, ZHANG Q Z, LI N X. Least absolute relative error estimation for functional quadratic multiplicative model [J]. Communications in Statistics:Theory and Methods, 2016, 45(19): 5802-5817.
|
[4] |
CHEN K N, LIN Y Y, WANG Z F, et al. Least product relative error estimation [J].Journal of Multivariate Analysis, 2016, 144: 91-98.
|
[5] |
WANG Z F, LIU W X, LIN Y Y. A change-point problem in relative error-based regression [J]. Test, 2015, 24: 835-856.
|
[6] |
LIU X H, LIN Y Y, WANG Z F. Group variable selection for relative error regression[J].Journal of Statistical Planning & Inference, 2016, 175: 40-50.
|
[7] |
MILLER R G. Least squares regression with censored data [J]. Biometrika, 1976,63:449-464.
|
[8] |
BUCKLEY J, JAMES I. Linear regression with censored data[J]. Biometrika, 1979,66(3): 429-436.
|
[9] |
JAMES I R, SMITH P J. Consistency results for linear regression with censored data[J].The Annals of Statistics, 1984, 12(2): 590-600.
|
[10] |
JIN Z Z, LIN D Y, YING Z L. On least-squares regression with censored data [J].Biometrika, 2006, 93(1): 147-161.
|
[11] |
KOUL H, SUSARLA V, VAN RYZIN J. Regression analysis with randomly right-censored data [J]. The Annals of Statistics, 1981, 9(6): 1276-1288.
|
[12] |
STUTE W. Consistent estimation under random censorship when covariables are present [J]. Journal of Multivariate Analysis, 1993, 45: 89-103.
|
[13] |
STUTE W. Distributional convergence under random censorship when covariables are present [J]. Scandinavian Journal of Statistics, 1996, 23: 461-471.
|
[14] |
HE S Y, HUANG X. Central limit theorem of linear regression model under right censorship [J]. Science in China Series A: Mathematics, 2003, 46(5): 600-610.
|
[15] |
BAO Y C, HE S Y, MEI C L. The Koul-Susarla-Van Ryzin and weighted least squares estimates for censored linear regression model: A comparative study [J].Computational Statistics & Data Analysis, 2007, 51: 6488-6497.
|
[16] |
BANG H, TSIATIS A A. Estimating medical costs with censored data [J]. Biometrika, 2000, 87(2): 329-343.
|
[17] |
MA Y Y, YIN G S. Censored quantile regression with covariate measurement errors[J].Statistica Sinica, 2011, 21: 949-971.
|
[18] |
SUN L Q, SONG X Y, ZHANG Z G. Mean residual life models with time-dependent coefficients under right censoring [J]. Biometrika, 2012, 99(1):185-197.
|
[19] |
FLEMING T R, HARRINGTON D P. Counting Processes and Survival Analysis [M]. New York: Wiley, 1991.
|
[20] |
VAN DER VAART A W. Asymptotic Statistics [M]. Cambridge: Cambridge University Press, 1998.
|
[21] |
ROBINS J M, ROTNITZKY A, ZHAO L P. Estimation of regression coefficients when some regressors are not always observed [J]. Journal of the American Statistical Association, 1994, 89(427): 846-866.
|
[22] |
GILL R D. Censoring and Stochastic Integrals [M]. Amsterdam: Mathematisch Centrum, 1980.)
|
[1] |
CHEN K N, GUO S J, LIN Y Y, et al. Least absolute relative error estimation [J].Journal of the American Statistical Association, 2010, 105(491): 1104-1112.
|
[2] |
ZHANG Q Z, WANG Q H. Local least absolute relative error estimating approach for partially linear multiplicative model [J]. Statistica Sinica, 2013, 23: 1091-1116.
|
[3] |
ZHANG T, ZHANG Q Z, LI N X. Least absolute relative error estimation for functional quadratic multiplicative model [J]. Communications in Statistics:Theory and Methods, 2016, 45(19): 5802-5817.
|
[4] |
CHEN K N, LIN Y Y, WANG Z F, et al. Least product relative error estimation [J].Journal of Multivariate Analysis, 2016, 144: 91-98.
|
[5] |
WANG Z F, LIU W X, LIN Y Y. A change-point problem in relative error-based regression [J]. Test, 2015, 24: 835-856.
|
[6] |
LIU X H, LIN Y Y, WANG Z F. Group variable selection for relative error regression[J].Journal of Statistical Planning & Inference, 2016, 175: 40-50.
|
[7] |
MILLER R G. Least squares regression with censored data [J]. Biometrika, 1976,63:449-464.
|
[8] |
BUCKLEY J, JAMES I. Linear regression with censored data[J]. Biometrika, 1979,66(3): 429-436.
|
[9] |
JAMES I R, SMITH P J. Consistency results for linear regression with censored data[J].The Annals of Statistics, 1984, 12(2): 590-600.
|
[10] |
JIN Z Z, LIN D Y, YING Z L. On least-squares regression with censored data [J].Biometrika, 2006, 93(1): 147-161.
|
[11] |
KOUL H, SUSARLA V, VAN RYZIN J. Regression analysis with randomly right-censored data [J]. The Annals of Statistics, 1981, 9(6): 1276-1288.
|
[12] |
STUTE W. Consistent estimation under random censorship when covariables are present [J]. Journal of Multivariate Analysis, 1993, 45: 89-103.
|
[13] |
STUTE W. Distributional convergence under random censorship when covariables are present [J]. Scandinavian Journal of Statistics, 1996, 23: 461-471.
|
[14] |
HE S Y, HUANG X. Central limit theorem of linear regression model under right censorship [J]. Science in China Series A: Mathematics, 2003, 46(5): 600-610.
|
[15] |
BAO Y C, HE S Y, MEI C L. The Koul-Susarla-Van Ryzin and weighted least squares estimates for censored linear regression model: A comparative study [J].Computational Statistics & Data Analysis, 2007, 51: 6488-6497.
|
[16] |
BANG H, TSIATIS A A. Estimating medical costs with censored data [J]. Biometrika, 2000, 87(2): 329-343.
|
[17] |
MA Y Y, YIN G S. Censored quantile regression with covariate measurement errors[J].Statistica Sinica, 2011, 21: 949-971.
|
[18] |
SUN L Q, SONG X Y, ZHANG Z G. Mean residual life models with time-dependent coefficients under right censoring [J]. Biometrika, 2012, 99(1):185-197.
|
[19] |
FLEMING T R, HARRINGTON D P. Counting Processes and Survival Analysis [M]. New York: Wiley, 1991.
|
[20] |
VAN DER VAART A W. Asymptotic Statistics [M]. Cambridge: Cambridge University Press, 1998.
|
[21] |
ROBINS J M, ROTNITZKY A, ZHAO L P. Estimation of regression coefficients when some regressors are not always observed [J]. Journal of the American Statistical Association, 1994, 89(427): 846-866.
|
[22] |
GILL R D. Censoring and Stochastic Integrals [M]. Amsterdam: Mathematisch Centrum, 1980.)
|