Abstract
Smooth tests for the logarithmic distribution are compared with three tests: the first is a test due to Epps and is based on a probability generating function, the second is the Anderson-Darling test, and the third is due to Klar and is based on the empirical integrated distribution function. These tests all have substantially better power than the traditional Pearson-Fisher X2 test of fit for the logarithmic. These traditional chi-squared tests are the only logarithmic tests of fit commonly applied by ecologists and other scientists.
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CITATION STYLE
Best, D. J., Rayner, J. C. W., & Thas, O. (2008). Tests of fit for the logarithmic distribution. Journal of Applied Mathematics and Decision Sciences, 2008. https://doi.org/10.1155/2008/463781
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