Biomedical Engineering Reference
In-Depth Information
application to insulin absorption kinetics, CompStat, (T. Havranek, A. Sidak
and M. Novak, Ed.), pp. 31-36, Physica-Verlag Wien., 1988.
74. P. Hougaard, A. Plum, and U. Ribel, Kernel function smoothing of insulin
absorption kinetics, Biometrics, 45 (1989), 1041-1052.
75. J.Z. Huang, C. Kooperberg, J. Stone, and Y.K. Truong, Functional ANOVA
modeling for proportional hazards regression, Ann. Statist., 28 (2000), 961-
999.
76. J.P. Imhof, Computing the distribution of quadratic forms in normal vari-
ables, Biometrika, 48 (1961), 419-426.
77. Z. Jin, D.Y. Lin, L.J. Wei, and Z. Ying, Rank-based inference for the accel-
erated failure time model, Biometrika, 90 (2003), 341-353.
78. M.P. Jones, A class of semiparametric regression for the accelerated failure
time model, Biometrika, 84 (1997), 73-84.
79. J.D. Kalbeisch and R.L. Prentice, The Statistical Analysis of Failure Time
Data, 2nd ed., John Wiley, New York, 2002.
80. E.L. Kaplan and P. Meier, Nonparametric estimation from incomplete ob-
servations, J. Am. Stat. Assoc., 53 (1958), 457-481.
81. H.T. Kim and Y.K. Truong, Nonparametric regression estimates with cen-
sored data: local linear smoothers and their applications, Biometrics,
54
(1998), 1434-1444.
82. C. Kooperberg, C.J. Stone, and Y.K. Truong, Hazard regression, J. Am.
Stat. Assoc., 90 (1995), 78-94.
83. C. Kooperberg, C.J. Stone, and Y.K. Truong, The L
2
rate of convergence
for hazard regression, Scand. J. Statist., 22 (1995), 144-157.
84. C. Kooperberg and D.B. Clarkson, Hazard regression with interval-censored
data, Biometrics, 53 (1997), 1485-1494.
85. D.A. Kouassi and J. Singh, A semiparametric approach to hazard estimation
with randomly censored observations, J. Am. Stat. Assoc., 92 (1997), 1351-
1355.
86. A.Y.C. Kuk and C.H. Chen, A mixture model combining logistic regression
with proportional hazards regression, Biometrika, 79 (1992), 531-541.
87. T.L. Lai and Z. Ying, Rank regression methods for left-truncated and right-
censored data, Ann. Statist., 19 (1991), 531-536.
88. T.L. Lai and Z. Ying, Large sample theory of a modied Buckley-James es-
timator for regression analysis with censored data, Ann. Statist., 19 (1991),
1370-1402.
89. L.S. Lasdon, A.D. Waren, A. Jain, and M. Ratner, Design and testing of
generalized reduced gradient code for nonlinear programming, ACM Trans.
Math. Softw., 4 (1978), 34-50.
90. J.F. Lawless, Statistical Models and Methods for Lifetime Data. 2nd ed.
John Wiley, New York, 2003.
91. M. LeBlanc and J. Crowley, Adaptive regression splines in the Cox model,
Biometrics, 55 (1999), 204-213.
92. C.S. Li, J.M.G. Taylor, and J.P. Sy, dentiability of cure models, Statist. &
Probab. Lett., 54 (2001), 389-395.
93. C.S. Li and J.M.G. Taylor, Smoothing covariate eects in cure models,
Search WWH ::
Custom Search