Power of the soft-thresholding Fisher's p-value combination test.
Details
We consider the following hypothesis test,
$$H_0: X_i\sim F_0, H_a: X_i\sim (1-\epsilon)F_0+\epsilon F_1$$
, where \(\epsilon\) is the mixing parameter,
\(F_0\) is the standard normal CDF and \(F = F_1\) is the CDF of normal distribution with \(\mu\) defined by mu and \(\sigma = 1\).
References
1. Hong Zhang and Zheyang Wu. "TFisher Tests: Optimal and Adaptive Thresholding for Combining p-Values", submitted.
# NOT RUN {alpha = 0.05#If the alternative hypothesis Gaussian mixture with eps = 0.1 and mu = 1.2:#power.soft(alpha, 100, 0.05, eps = 0.1, mu = 1.2)
# }