REFERENCES
- Acar, E., Craiu, R., and Yao, F. (2011), “Dependence Calibration in Conditional Copulas: A Nonparametric Approach,” Biometrics, 67, 445–453.
- Anderson, J.E., Louis, T.A., Holm, N.V., and Harvald, B. (1992), “Time-Dependent Association Measures for Bivariate Survival Distributions,” Journal of the American Statistical Association, 87, 641–650.
- Bairamov, I., Kotz, S., and Kozubowski, T. (2003), “A New Measure of Linear Local Dependence,” Statistics: A Journal of Theoretical and Applied Statistics, 37, 243–258.
- Bjerve, S., and Doksum, K. (1993), “Correlation Curves: Measures of Association as Functions of Covariate Values,” The Annals of Statistics, 21, 890–902.
- Blomqvist, N. (1950), “On a Measure of Dependence Between Two Random Variables,” The Annals of Mathematical Statistics, 21, 593–600.
- Borkowf, C.B. (1999), “A New Method for Approximating the Asymptotic Variance of Spearman’s Rank Correlation,” Statistica Sinica, 9, 535–558.
- Borkowf, C.B., Gail, M.H., Carroll, R.J., and Gill, R.D. (1997), “Analyzing Bivariate Continuous Data Grouped Into Categories Defined by Empirical Quantiles of Marginal Distributions,” Biometrics, 53, 1054–1069.
- Brown, B., and Wang, Y. (2005), “Standard Errors and Covariance Matrices for Smoothed Rank Estimators,” Biometrika, 92, 149–158.
- Brown, B., and Wang, Y. (2007), “Induced Smoothing for Rank Regression With Censored Survival Times,” Statistics in Medicine, 26, 828–836.
- Clayton, D. (1978), “A Model for Association in Bivariate Life Tables and its Application in Epidemiological Studies of Familial Tendency in Chronic Disease Incidence,” Biometrika, 65, 141–151.
- Coles, S., Heffernan, J., and Tawn, J. (1999), “Dependence Measures for Extreme Value Analyses,” Extremes, 2, 339–365.
- Diggle, P., Heagerty, P., Liang, K.-Y., and Zeger, S.L. (2002), Analysis of Longitudinal Data, Oxford: Oxford University Press.
- Doksum, K., Blyth, S., Bradlow, E., Meng, X.-L., and Zhao, H. (1994), “Correlation Curves as Local Measures of Variance Explained by Regression,” Journal of the American Statistical Association, 89, 571–582.
- Gijbels, I., Veraverbeke, N., and Omelka, M. (2011), “Conditional Copulas, Association Measures and Their Applications,” Computational Statistics & Data Analysis, 55, 1919–1932.
- Gorfine, M., Zucker, D.M., and Hsu, L. (2006), “Prospective Survival Analysis With a General Semiparametric Shared Frailty Model: A Pseudo Full Likelihood Approach,” Biometrika, 93, 735–741.
- He, X., and Zhu, L.-X. (2003), “A Lack-of-Fit Test for Quantile Regression,” Journal of the American Statistical Association, 98, 1013–1022.
- Holland, P., and Wang, Y. (1987), “Dependence Function for Continuous Bivariate Densities,” Communications in Statistics—Theory and Methods, 16, 863–876.
- Hougaard, P. (2000), Analysis of Multivariate Survival Data, New York: Springer.
- Hsu, L., Gorfine, M., and Malone, K. (2007), “On Robustness of Marginal Regression Coefficient Estimates and Hazard Functions in Multivariate Survival Analysis of Family Data When the Frailty Distribution is Mis-Specified,” Statistics in Medicine, 26, 4657–4678.
- Hsu, L., and Prentice, L. (1996), “On Assessing the Strength of Dependency Between Failure Time Variates,” Biometrika, 83, 491–506.
- Koenker, R. (2005), Quantile Regression (Vol. 38), Cambridge: Cambridge University Press.
- Koenker, R., and Bassett, G. Jr (1978), “Regression Quantiles,” Econometrica, 46, 33–50.
- Kolev, N., Anjos, U., and Mendes, B. (2006), “Copulas: A Review and Recent Developments,” Stochastic Models, 22, 617–660.
- Kosorok, M., Lee, B., and Fine, J. (2004), “Robust Inference for Univariate Proportional Hazards Frailty Regression Models,” The Annals of Statistics, 32, 1448–1491.
- Lin, D.Y., Wei, L.J., and Ying, Z. (1993), “Checking the Cox Model With Cumulative Sums of Martingale-Based Residuals,” Biometrika, 80, 557–572.
- Loehlin, J. (1972), “An Analysis of Alcohol-Related Questionnaire Items From the National Merit Twin Study,” Annals of the New York Academy of Sciences, 197, 117–120.
- Loehlin, J., and Nichols, R. (1976), “Heredity, Environment, & Personality: A Study of 850 Sets of Twins,” Austin, TX: University of Texas Press.
- Mu, Y., and He, X. (2007), “Power Transformation Toward a Linear Regression Quantile,” Journal of the American Statistical Association, 102, 269–279.
- Nelsen, R. (2006), An Introduction to Copulas, New York: Springer Verlag.
- Oakes, D. (1982), “A Model for Association in Bivariate Survival Data,” Journal of the Royal Statistical Society, Series B, 44, 414–422.
- Oakes, D. (1989), “Bivariate Survival Models Induced by Frailties,” Journal of the American Statistical Association, 84,487–493.
- Pang, L., Lu, W., and Wang, H. (2012), “Variance Estimation in Censored Quantile Regression via Induced Smoothing,” Computational Statistics & Data Analysis, 56, 785–796.
- Prentice, R., and Cai, J. (1992), “Covariance and Survivor Function Estimation Using Censored Multivariate Failure Time Data,” Biometrika, 79, 495–512.
- Schmid, F., and Schmidt, R. (2007), “Nonparametric Inference on Multivariate Versions of Blomqvists Beta and Related Measures of Tail Dependence,” Metrika, 66, 323–354.
- Sibuya, M. (1960), “Bivariate Extreme Statistics, i,” Annals of the Institute of Statistical Mathematics, 11, 195–210.
- Therneau, T.M., and Grambsch, P.M. (2000), Modeling Survival Data: Extending the Cox Model, New York: Springer-Verlag.
- Veraverbeke, N., Omelka, M., and Gijbels, I. (2011), “Estimation of a Conditional Copula and Association Measures,” Scandinavian Journal of Statistics, 38, 766–780.
- Wang, Y., Shao, Q., and Zhu, M. (2009), “Quantile Regression Without the Curse of Unsmoothness,” Computational Statistics & Data Analysis, 53, 3696–3705.
- Wei, Y. (2008), “An Approach to Multivariate Covariate-Dependent Quantile Contours With Application to Bivariate Conditional Growth Charts,” Journal of the American Statistical Association, 103, 397–409.
- Yu, K., and Jones, M. (1998), “Local Linear Quantile Regression,” Journal of the American Statistical Association, 93, 228–237.