In statistics, the Cucconi test is a

nonparametric test Nonparametric statistics is a type of statistical analysis that makes minimal assumptions about the underlying distribution of the data being studied. Often these models are infinite-dimensional, rather than finite dimensional, as in parametric sta ...

for jointly comparing

central tendency In statistics, a central tendency (or measure of central tendency) is a central or typical value for a probability distribution.Weisberg H.F (1992) ''Central Tendency and Variability'', Sage University Paper Series on Quantitative Applications in ...

and variability (detecting location and scale changes) in two samples. Many

rank test {{Short description, Type of statistical test In statistics, a rank test is any test involving ranks. Rank tests are related to permutation tests. Motivation The motivation to test differences between samples is that ranks are in some sense maxima ...

s have been proposed for the two-sample location-scale problem. Nearly all of them are Lepage-type tests, that is a combination of a location test and a scale test. The Cucconi test was first proposed by Odoardo Cucconi in 1968. The Cucconi test is not as familiar as other location-scale tests but it is of interest for several reasons. First, from a historical point of view, it was proposed some years before the

Lepage test In statistics, the Lepage test is an exact distribution-free test (nonparametric test) for jointly monitoring the location (central tendency) and scale ( variability) in two-sample treatment versus control comparisons. It is a rank test for the two ...

, the standard rank test for the two-sample location-scale problem. Secondly, as opposed to other location-scale tests, the Cucconi test is not a combination of location and scale tests. Thirdly, it compares favorably with Lepage type tests in terms of power and type-one error probability and very importantly it is easier to be computed because it requires only the ranks of one sample in the combined sample, whereas the other tests also require scores of various types as well as to permutationally estimate mean and variance of test statistics because their analytic formulae are not available. The Cucconi test is based on the following statistic: :

\text = \frac.

where

U

is based on the standardized sum of squared ranks of the first sample elements in the pooled sample, and

V

is based on the standardized sum of squared contrary-ranks of the first sample elements in the pooled sample.

\rho

is the correlation coefficient between

U

and

V

. The test statistic rejects for large values, a table of critical values is available. The p-value can be easily computed via permutations. The interest on this test has recently increased spanning applications in many different fields like hydrology, applied psychology and industrial quality control.

External links

Shewhart–Cucconi Chart
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CUSUM Cucconi Chart
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References

{{Reflist Nonparametric statistics

See also

External links

References