A comparative study of tests for the difference of two Poisson means

We investigate different test procedures for testing the difference of two Poisson means. Asymptotic tests, tests based on an approximate p-value method, and a likelihood ratio test are considered. Size and power performance of these tests are studied by means of Monte Carlo simulation under different settings. If one wants to control the actual significance level at or below the pre-chosen nominal level, tests based on approximate p-value method are the desirable candidates. If one allows tests whose actual significance levels may occasionally exceed the pre-chosen nominal level by an acceptable margin, asymptotic tests based on an unbiased estimate and constrained maximum likelihood estimate are reasonable alternatives. We illustrate these testing procedures with a breast cancer example.

[1]  Allan Birnbaum Some procedures for comparing Poisson processes or populations , 1953 .

[2]  J. Przyborowski,et al.  Homogeneity of results in testing samples from Poisson series, with an application to testing clover seed for dodder. , 1940 .

[3]  F. T. Wright Order-Restricted Inferences , 2006 .

[4]  Mitchell H. Gail,et al.  Power Computations for Designing Comparative Poisson Trials , 1974 .

[5]  Tim Robertson,et al.  Order Restricted Statistical Tests on Multinomial and Poisson Parameters: The Starshaped Restriction , 1982 .

[6]  Michael D. Huffman An Improved Approximate Two‐Sample Poisson Test , 1984 .

[7]  G. Enderlein,et al.  Brownlee, K. A.: Statistical Theory and Methodology in Science and Engineering. Wiley, New York 1960; 570 S., $ 16,75 , 1961 .

[8]  F. Haight Handbook of the Poisson Distribution , 1967 .

[9]  Henry C. Thode,et al.  Power and sample size requirements for tests of differences between two Poisson rates , 1997 .

[10]  E. D. Rest,et al.  Statistical Theory and Methodology in Science and Engineering , 1963 .

[11]  K. Krishnamoorthy,et al.  A More Powerful Test for Comparing Two Poisson Means , 2002 .

[12]  H. S. Sichel,et al.  On a Significance Test for Two Poisson Variables , 1973 .

[13]  Anders Hald,et al.  Statistical Theory with Engineering Applications , 1952 .

[14]  David R. Cox,et al.  The statistical analysis of series of events , 1966 .

[15]  L. N. Balaam,et al.  Statistical Theory and Methodology in Science and Engineering , 1966 .

[16]  Katherine Detre,et al.  294. Note: The Comparison of Two Poisson-Distributed Observations , 1970 .

[17]  Ling Wang,et al.  Homogeneity tests for several Poisson populations , 2009, Comput. Stat. Data Anal..

[18]  D. G. Chapman,et al.  On tests and estimates for the ratio of poisson means , 1952 .

[19]  J. K. Ord,et al.  Handbook of the Poisson Distribution , 1967 .

[20]  H. Ng,et al.  Testing the equality of two Poisson means using the rate ratio , 2005, Statistics in medicine.

[21]  M. Graffar [Modern epidemiology]. , 1971, Bruxelles medical.

[22]  H. Chernoff On the Distribution of the Likelihood Ratio , 1954 .

[23]  J. F. Ractliffe The Significance of the Difference Between Two Poisson Variables: An Experimental Investigation , 1964 .

[24]  Lee J. Bain,et al.  Experiment Size and Power Comparisons for Two‐Sample Poisson Tests , 1982 .

[25]  R G Newcombe,et al.  Confidence limits for the ratio of two rates based on likelihood scores: non-iterative method. , 2003, Statistics in medicine.

[26]  Moshe Shaked,et al.  Estimation of Starshaped Sequences of Poisson and Normal Means , 1979 .