Rank Tests for Complete Block Designs

I n this paper we suggest rank testa for main effects and for interaction when there are two factors and two levels within each factor and when, in addition, there are I blocks. The asymptotic distributions of the test statistiw under H, are derived. The application of the testa is illustrated by an

A rank test is preaented for analysis of incomplete unbalanced designs, i.e. for designs that may have been originally planned to be either balanced or unbalanced and where some observations may be missing at random. This test is a modification of the procedure of BENARD and VAN EL-TEREN (1953) base

Nonparametric factorial designs for multivariate observations are considered under the framework of general rank-score statistics. Unlike most of the literature, we do not assume the continuity of the underlying distribution functions. The models studied include general repeated measures designs, co

A distribution-free test ie conaidered for Ming thefreatmenteffecta in block designs with different cell frequencies. A teet statistic whioh is a function of treatment ranks has been proposed which is distributed as chi-square for large samples. The null distribution of the teat etatietic has been o