| Popis: |
Summary The parameteric tests for equality of variance are well known. The classical F-test is typically used to test the hypothesis of equality of two variances, while tests such as those developed by Bartlett (1937) are commonly used for the k-sample hypothesis. These tests assume an underlying normal distribution and are quite sensitive to departures from normality (Box, 1953). Thus, when considering data that are from non-normal distributions, alternative nonparametric tests must be employed. Fligner (1979) has proposed a class of two-sample distribution-free tests which possess very desirable properties and are attractive alternatives to other nonparametric tests for scale. The present paper extends the Fligner class of tests to the more general k-sample case. |
Plný text