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On the stochastic ordering of folded binomials

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  • Porzio, Giovanni C.
  • Ragozini, Giancarlo

Abstract

Folded binomials arise from binomial distributions when the number of successes is considered equivalent to the number of failures or they are indistinguishable. Formally, if Y~Bin(m,[pi]) is a binomial random variable, then the random variable X=min(Y,m-Y) is folded binomial distributed with parameters m and p=min([pi],1-[pi]). In this work, we present results on the stochastic ordering of folded binomial distributions. Providing an equivalence between their cumulative distribution functions (cdf) and a combination of two Beta random variable cdf's, we prove both that folded binomials are stochastically ordered with respect to their parameter p given the number of trials m, and that they are stochastically ordered with respect to their parameter m given p. Furthermore, the reader is offered two corollaries on strict stochastic dominance.

Suggested Citation

  • Porzio, Giovanni C. & Ragozini, Giancarlo, 2009. "On the stochastic ordering of folded binomials," Statistics & Probability Letters, Elsevier, vol. 79(9), pages 1299-1304, May.
    • Handle: RePEc:eee:stapro:v:79:y:2009:i:9:p:1299-1304
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    Cited by:

    1. Berenhaut, Kenneth S. & Bergen, Lauren D., 2011. "Stochastic orderings, folded beta distributions and fairness in coin flips," Statistics & Probability Letters, Elsevier, vol. 81(6), pages 632-638, June.

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