An algorithm and FORTRAN program are presented for the Terpstra-Jonckheere test statistic and associated probability value based on a randomization routine.
Get full access to this article
View all access options for this article.
References
1.
BerryK. J.MielkeP. W. (1997) Exact and approximate probability values for the Terpstra-Jonckheere test against ordered alternatives. Perceptual and Motor Skills, 85, 107–111.
2.
ConoverW. J. (1999) Practical nonparametric statistics. (3rd ed.) New York: Wiley.
3.
JonckheeraeA. R. (1954) A distribution-free k-sample test against ordered alternatives. Biomefrika, 41, 133–145.
4.
KahanerD.MolerC.NashS. (1988) Numerical rnethods and software. Englewood Cliffs, NJ: Prentice Hall
5.
TerpstraT. J. (1952) The asymptotic normality and consistency of Kendall's test against trend, when ties are present in one ranking. Indagationes Mathematicae, 14, 327–333.
