On the structure of symmetric sample testing: A distribution-free approach

In this paper, we propose simple exact procedures for testing both a location shift andÂor a scale change between two multivariate distributions. Our tests are strictly distribution-free and can be made either scale invariant or rotation invariant. Our approach combines a generalization of the Wilco

The authors (1968) have previously given tables of the percentage points of the range ( = w ) of r samples from a multinomial distribution of r cells each with probability r-i, r=2(1)10. This paper presents the small sample power of to for r=2(1)6 under alternatives 61 to the null hypothesis Ho of a

## Abstract In this paper two nonparametric tests are given for testing the nullhypothesis of parallelity of response curves in __r__ samples. The first procedure is done by a permutation test, whose practical applicability is ensured by a FORTRAN‐subroutine available from the author. As the comput

Generalizing recent work of P. C. Matthews and A. L. Rukhin (Ann. Appl. Probab. 3 (1993), 454 466), we obtain the limit law of the largest interpoint Euclidean distance for a spherically symmetric multivariate sample of the Kotz distribution. While going through the proof, some errors in the reasoni