References
- Beran , R. 1974 . Asymptotically efficient adaptive rank estimates in location models . Ann. Statist. , 2 : 63 – 74 .
- Billingsley , P. 1968 . Convergence of Probability Measures , New York : John Wiley .
- Eplett , W.J.R. 1982 . Rank tests generated by continuous piecewise linear functions . Ann. Statist. , 10 : 569 – 574 .
- Ghosh , M. and Sen , P.K. 1972 . On bounded width confidence intervals for the regression coefficient based on a class of rank order statistics , A Vol. 34 , 33 – 52 . Sankhyā .
- Hájek , J. 1968 . Asymtotic normality of simple linear rank statistics under alternatives . Ann. Math. Statist. , 39 : 325 – 346 .
- Hájek , J. 1970 . “ Miscellaneous problems of rank test theory ” . In In Nonparametric Techniques in Statistical Inference , Edited by: Puri , M.L. 1 – 19 . New York : Cambridge University Press .
- Hoeffding , W. 1948 . A class of statistics with asymptotically normal distribution . Ann. Math. Statist. , 19 : 293 – 325 .
- Hoeffding , W. 1963 . Probability inequalities for sums of bounded random variables . J. Amer. Statist. Assoc. , 58 : 13 – 30 .
- Hušková , M. 1982 . On bounded length sequential confidence interval for parameter in regression model based on ranks . Colloguia Math. Soc. Janos Bolyai , 32 : 435 – 463 . Nonparametric Statistical Inference,Budapest
- Hušková , M. and Jurečková , J. 1981 . Second order asymptotic relations of M-estimators and R-estimators in two-sample location model . J. Statist. Plan. Infer. , 5 : 309 – 328 .
- Jurečková , J. 1969 . Asymptotic linearity of a rank statistic in regression parameter . Ann. Math. Statist. , 40 : 1889 – 1900 .
- Jurečková , J. 1971 . Nonparametric estimates of regression coefficients . Ann. Math. Statist. , 42 : 1328 – 1338 .
- Sen , P.K . 1981 . Sequential Nonparametrics: Invariance Principles and Statistical Inference , New York : John wiley .