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Fisher's method: Information and Much More from Answers.com

️Wed Jul 01 2015

In statistics, Fisher's method is a data fusion or "meta-analysis" (analysis after analysis) technique for combining the results from a variety of independent tests bearing upon the same overall hypothesis (H₀) as if in a single large test.

Fisher's method combines extreme value probabilities, P(results at least as extreme, assuming H₀ true) from each test, called "p-values", into one test statistic (X²) having a chi-square distribution using the formula

$X^2_{2k} = -2\sum_{i=1}^k \log_e(p_i).$

The p-value for X² itself can then be interpolated from a chi-square table using 2k "degrees of freedom", where k is the number of tests being combined. As in any similar test, H₀ is rejected for small p-values, usually < 0.05.

This figure shows how two p-values ~0.10 (or ~0.04 and ~0.25) combine into one ~0.05.

In the case that the tests are not independent, the null distribution of X² is more complicated. If the correlations between the log_e(p_i) are known, these can be used to form an approximation.

References

Fisher, R. A. (1948) "Combining independent tests of significance", American Statistician, vol. 2, issue 5, page 30. (In response to Question 14)

Fisher's method: Information and Much More from Answers.com

References

See also