References
- Barndorff-Nielsen, O. (1963). On the Limit Behaviour of Extreme Order Statistics, Annals of Mathematical Statistics 34: 992–1002.
- Berk, R. H. (1975). Locally Most Powerful Sequential Tests, Annals of Statistics 3: 373–381.
- Ghosh, B. K. and Sen, P. K. (1981). Handbook of Sequential Analysis, edited volume, New York: Dekker.
- Hájek, J. and Šidák, Z. (1967). Theory of Rank Tests, Prague: Academia.
- Hájek, J., Šidák, Z., and Sen, P. K. (1999). Theory of Rank Tests, 2nd edition, San Diego: Academic Press.
- Hušková, M. (1991). Sequentially Adaptive Nonparametric Procedures, in Handbook of Sequential Analysis, B. K. Ghosh and P. K. Sen, eds., pp. 459–474, New York: Dekker.
- Jurečková, J. and Sen, P. K. (1982). M-Estimators and L-Estimators of Location: Uniform Integrability and Asymptotic Risk-Efficient Sequential Versions, Communications in Statistics - Sequential Analysis 1: 27–56.
- Khmaladze, E. V. (2011). Sequential Ranks, in International Encyclopedia of Statistical Science, M. Lovric, ed., pp. 1308–1311, Berlin: Springer.
- Lombard, F. (1977). Sequential Procedures Based on Kendall’s Tau Statistics, South African Statistical Journal 11: 79–87.
- Lombard, F. (1981). An Invariance Principle for Sequential Nonparametric Test Statistics under Contiguous Alternatives, South African Statistical Journal 15: 129–152.
- Lombard, F. (1983). Asymptotic Distributions of Rank Statistics in the Change-Point Problem, South African Statistical Journal 17: 83–105.
- Lombard, F. and Mason, D. M. (1985). Limit Theorems for Generalized Sequential Rank Statistics, Zeitschrift für Wahrscheinlichkeitstheorie und Verwandte Gebiete 70: 395–410.
- Mason, D. M. (1981). On the Use of a Statistic Based on Sequential Ranks to Prove Limit Theorems for Simple Linear Rank Statistics, Annals of Statistics 9: 424–436.
- Mason, D. M. (1984). A Bahadur Efficiency Comparison between One and Two Sample Rank Statistics and Their Sequential Rank Statistic Analogues, Journal of Multivariate Analysis 14: 181–200.
- Miller, R. G. (1970). Sequential Signed-Rank Test, Journal of American Statistical Association 65: 1554–1561.
- Miller, R. G. (1973). A Two Sample Sequential Wilcoxon Test, Technical Report 46, Stanford: Department of Statistics, Stanford University.
- Novikov, A. and Novikov, P. (2010). Locally Most Powerful Sequential Tests of a Simple Hypothesis vs. One-Sided Alternatives, Journal of Statistical Planning and Inference 140: 750–765.
- Sen, P. K. (1981). Sequential Nonparametrics: Invariance Principles and Statistical Inference, New York: Wiley.
- Siegel, S. and Tukey, J. W. (1960). A Nonparametric Sum of Ranks Procedure for Relative Spread in Unpaired Samples, Journal of American Statistical Association 55: 429–445.
- Zhou, M., Zhou, Q., and Geng, W. (2016). A New Nonparametric Control Chart Monitoring Variability, Quality and Reliability Engineering International 32: 2471–2479.