Description Usage Arguments Value Examples
We propose a simple sampling scheme to verify significant outlier loci subject to local adaptation based on the distribution of the α_{I} values observed after the MCMC iterations (approximated through a region-specific normal distribution (N(α_{I})) without using a time consuming reversible jump model for testing the null hypotheses:
1. For each region I, sample a single value x_{I} \sim N(α_{I}) and y_{I} \sim N(α_{I}), resulting in a distribution of sampled values D_{x} and D_{y} across regions.
2. For each region I, increment its counter c_I if y_I is above the q-quantile for D_{x}.
3. repeat (1-2) 1000 times
The empirical P-value for each α_{I} is the number of times the sample x_{I} is greater than the user-defined significance level q (e.g., the 0.95 quantile) divided by the number of iterations (1000 times).
1 |
BlockFeST.result |
an object returned from the function BlockFeST |
q |
quantile |
empirical P-values
1 2 3 4 | snps <- system.file("extdata", "snps.txt", package="BlockFeST")
groups <- system.file("extdata", "groups.txt", package="BlockFeST")
BlockFeST.result <- BlockFeST(input=snps, GROUP=groups, nb=3, runtime=10)
P <- calcPval(BlockFeST.result)
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