Unbiased Estimators for the Parameters of the Binomial and Multinomial Distributions

Abstract

The exact expression is derived for the expected value, < pi> , for the parameter for any bin i of a histogram following a multinomial distribution derived by sorting N observations into bins of B classes, if ni of the observations are found to be sorted into bin i. This expected value is found to be < pi> = ni + 1 N + B. The expected value for the variance is found to be < pi > (1-< pi >)N+B+1. A general expression is derived to determine < piz > for arbitrary values of B and z. These expressions hold provided there is no a priori reason for pi associated with any bin to have a value that is exactly equal to 0. For the particular case of the binomial distribution (B=2), these estimators are tested by examining how often the value of ptrue, the value which is used to generate sets of pseudo-random binomial variates, falls within 1.96 estimated standard deviations of the estimated value < p >. When compared with the results of identical, earlier reported tests for small sample sizes, the unbiased estimators derived here predictably outperform asymptotically unbiased estimators