Hand's paradox

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Template:Multiple issues In statistics, Hand's paradox arises from ambiguity when comparing two treatments. It shows that a comparison of the effects of the treatments applied to two independent groups that can contradict a comparison between the effects of both treatments applied to a single group.

Comparisons of two treatments often involve comparing the responses of a random sample of patients receiving one treatment with an independent random sample receiving the other. One commonly used measure of the difference is then the probability that a randomly chosen member of one group will have a higher score than a randomly chosen member of the other group. However, in many situations, interest really lies on which of the two treatments will give a randomly chosen patient the greater probability of doing better. These two measures, a comparison between two randomly chosen patients, one from each group, and a comparison of treatment effects on a randomly chosen patient, can lead to different conclusions.

This has been called Hand's paradox,^[1][2] and appears to have first been described by David J. Hand.^[3]

Label the two treatments A and B and suppose that:

Patient 1 would have response values 2 and 3 to A and B respectively. Patient 2 would have response values 4 and 5 to A and B respectively. Patient 3 would have response values 6 and 1 to A and B respectively.

Then the probability that the response to A of a randomly chosen patient is greater than the response to B of a randomly chosen patient is 6/9 = 2/3. But the probability that a randomly chosen patient will have a greater response to A than B is 1/3. Thus a simple comparison of two independent groups may suggest that patients have a higher probability of doing better under A, whereas in fact patients have a higher probability of doing better under B.

Suppose we have two random variables, ${\displaystyle x_A\sim N(1,1)}$ and ${\displaystyle x_B\sim N(0,1)}$, corresponding to the effects of two treatments. If we assume that ${\displaystyle x_A}$ and ${\displaystyle x_B}$ are independent, then ${\displaystyle \mathrm{Pr}(x_A>x_B)=0.76}$, suggesting that A is more likely to benefit a patient than B. In contrast, the joint distribution which minimizes ${\displaystyle Pr(x_A>x_B)}$ leads to ${\displaystyle Pr(x_A>x_B)\ge 0.38}$. This means that it is possible that in up to 62% of cases treatment B is better than treatment A.

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