inst/shiny-examples/SCD-effect-sizes/markdown/Tau.md
In jepusto/SingleCaseES: A Calculator for Single-Case Effect Sizes
Parameter definition
Tau is one of several effect sizes proposed by Parker, Vannest, Davis, and Sauber (2011) and known collectively as "Tau-U." The basic estimator Tau does not make any adjustments for time trends. For an outcome where increase is desirable, the effect size parameter is
$$\tau = \text{Pr}(Y^B > Y^A) - \text{Pr}(Y^B < Y^A)$$
(for an outcome where decrease is desirable, the effect size parameter would have the opposite sign). This parameter is a linear transformation of the NAP parameter $\theta$:
$$\tau = 2 \theta - 1.$$
Estimation
Let $y^A_1,...,y^A_m$ denote the observations from phase A. Let $y^B_1,...,y^B_n$ denote the observations from phase B. For an outcome where increase is desirable, calculate
$$w_{ij} = I(y^B_j > y^A_i) - I(y^B_j < y^A_i)$$
(for an outcome where decrease is desirable, one would instead use $w_{ij} = I(y^B_j < y^A_i) - I(y^B_j > y^A_i)$). The effect size index is then calculated as
$$
\text{Tau} = \frac{1}{m n} \sum_{i=1}^m \sum_{j=1}^n w_{ij} = 2 \times \text{NAP} - 1.
$$
Standard errors and confidence intervals for Tau are calculated using transformations of the corresponding SEs and CIs for NAP. All of the methods assume that the observations are mutually independent and are identically distributed within each phase. The standard error for Tau is calculated as $SE_{\text{Tau}} = 2 SE_{\text{NAP}}$, where $SE_{\text{NAP}}$ is the unbiased standard error for NAP from Sen (1967). The CI for $\tau$ is calculated as
$$
[L_{\tau}, U_{\tau}] = [2 L_{\theta} - 1, 2 U_{\theta} - 1],
$$
where $L_{\theta}$ and $U_{\theta}$ are the lower and upper bounds of the CI for the NAP parameter $\theta$, calculated using a method proposed by Newcombe (2006, method 5).
Primary reference
Parker, R. I., Vannest, K. J., Davis, J. L., & Sauber, S. B. (2011). Combining nonoverlap and trend for single-case research: Tau-U. Behavior Therapy, 42(2), 284--299. https://dx.doi.org/10.1016/j.beth.2010.08.006
Additional references
Sen, P. K. (1967). A note on asymptotically distribution-free confidence bounds for P{X<Y}, based on two independent samples. The Annals of Mathematical Statistics, 29(1), 95-102. https://www.jstor.org/stable/25049448
Newcombe, R. G. (2006). Confidence intervals for an effect size measure based
on the Mann-Whitney statistic. Part 2: Asymptotic methods and evaluation.
Statistics in Medicine, 25(4), 559--573. https://dx.doi.org/10.1002/sim.2324
jepusto/SingleCaseES documentation built on Aug. 21, 2023, 12:08 p.m.
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Parameter definition
Tau is one of several effect sizes proposed by Parker, Vannest, Davis, and Sauber (2011) and known collectively as "Tau-U." The basic estimator Tau does not make any adjustments for time trends. For an outcome where increase is desirable, the effect size parameter is
$$\tau = \text{Pr}(Y^B > Y^A) - \text{Pr}(Y^B < Y^A)$$
(for an outcome where decrease is desirable, the effect size parameter would have the opposite sign). This parameter is a linear transformation of the NAP parameter $\theta$:
$$\tau = 2 \theta - 1.$$
Estimation
Let $y^A_1,...,y^A_m$ denote the observations from phase A. Let $y^B_1,...,y^B_n$ denote the observations from phase B. For an outcome where increase is desirable, calculate
$$w_{ij} = I(y^B_j > y^A_i) - I(y^B_j < y^A_i)$$
(for an outcome where decrease is desirable, one would instead use $w_{ij} = I(y^B_j < y^A_i) - I(y^B_j > y^A_i)$). The effect size index is then calculated as
$$ \text{Tau} = \frac{1}{m n} \sum_{i=1}^m \sum_{j=1}^n w_{ij} = 2 \times \text{NAP} - 1. $$
Standard errors and confidence intervals for Tau are calculated using transformations of the corresponding SEs and CIs for NAP. All of the methods assume that the observations are mutually independent and are identically distributed within each phase. The standard error for Tau is calculated as $SE_{\text{Tau}} = 2 SE_{\text{NAP}}$, where $SE_{\text{NAP}}$ is the unbiased standard error for NAP from Sen (1967). The CI for $\tau$ is calculated as
$$ [L_{\tau}, U_{\tau}] = [2 L_{\theta} - 1, 2 U_{\theta} - 1], $$
where $L_{\theta}$ and $U_{\theta}$ are the lower and upper bounds of the CI for the NAP parameter $\theta$, calculated using a method proposed by Newcombe (2006, method 5).
Primary reference
Parker, R. I., Vannest, K. J., Davis, J. L., & Sauber, S. B. (2011). Combining nonoverlap and trend for single-case research: Tau-U. Behavior Therapy, 42(2), 284--299. https://dx.doi.org/10.1016/j.beth.2010.08.006
Additional references
Sen, P. K. (1967). A note on asymptotically distribution-free confidence bounds for P{X<Y}, based on two independent samples. The Annals of Mathematical Statistics, 29(1), 95-102. https://www.jstor.org/stable/25049448
Newcombe, R. G. (2006). Confidence intervals for an effect size measure based on the Mann-Whitney statistic. Part 2: Asymptotic methods and evaluation. Statistics in Medicine, 25(4), 559--573. https://dx.doi.org/10.1002/sim.2324
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