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This vignette illustrates the basic usage of the knockoff
package with Model-X knockoffs. In this scenario we assume that the distribution of the predictors is known (or that it can be well approximated), but we make no assumptions on the conditional distribution of the response. For simplicity, we will use synthetic data constructed from a linear model such that the response only depends on a small fraction of the variables.
set.seed(1234)
# Problem parameters
= 200 # number of observations
n = 200 # number of variables
p = 60 # number of variables with nonzero coefficients
k = 4.5 # signal amplitude (for noise level = 1)
amplitude
# Generate the variables from a multivariate normal distribution
= rep(0,p)
mu = 0.25
rho = toeplitz(rho^(0:(p-1)))
Sigma = matrix(rnorm(n*p),n) %*% chol(Sigma)
X
# Generate the response from a linear model
= sample(p, k)
nonzero = amplitude * (1:p %in% nonzero) / sqrt(n)
beta = function(X) X %*% beta + rnorm(n)
y.sample = y.sample(X) y
To begin, we call knockoff.filter
with all the default settings.
library(knockoff)
= knockoff.filter(X, y) result
We can display the results with
print(result)
## Call:
## knockoff.filter(X = X, y = y)
##
## Selected variables:
## [1] 8 11 15 27 45 50 51 60 66 68 71 81 87 88 99 101 111 112 114
## [20] 134 135 146 150 152 153 158 160 161 162 164 166 172 177 179 181
The default value for the target false discovery rate is 0.1. In this experiment the false discovery proportion is
= function(selected) sum(beta[selected] == 0) / max(1, length(selected))
fdp fdp(result$selected)
## [1] 0.02857143
By default, the knockoff filter creates model-X second-order Gaussian knockoffs. This construction estimates from the data the mean \(\mu\) and the covariance \(\Sigma\) of the rows of \(X\), instead of using the true parameters (\(\mu, \Sigma\)) from which the variables were sampled.
The knockoff package also includes other knockoff construction methods, all of which have names prefixed withknockoff.create
. In the next snippet, we generate knockoffs using the true model parameters.
= function(X) create.gaussian(X, mu, Sigma)
gaussian_knockoffs = knockoff.filter(X, y, knockoffs=gaussian_knockoffs)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = gaussian_knockoffs)
##
## Selected variables:
## [1] 11 15 27 50 60 66 82 83 94 99 114 134 135 141 146 150 153 160 161
## [20] 162 165 166 172 179 181
Now the false discovery proportion is
fdp(result$selected)
## [1] 0
By default, the knockoff filter uses a test statistic based on the lasso. Specifically, it uses the statistic stat.glmnet_coefdiff
, which computes \[
W_j = |Z_j| - |\tilde{Z}_j|
\] where \(Z_j\) and \(\tilde{Z}_j\) are the lasso coefficient estimates for the jth variable and its knockoff, respectively. The value of the regularization parameter \(\lambda\) is selected by cross-validation and computed with glmnet
.
Several other built-in statistics are available, all of which have names prefixed with stat
. For example, we can use statistics based on random forests. In addition to choosing different statistics, we can also vary the target FDR level (e.g. we now increase it to 0.2).
= knockoff.filter(X, y, knockoffs = gaussian_knockoffs, statistic = stat.random_forest, fdr=0.2)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = gaussian_knockoffs,
## statistic = stat.random_forest, fdr = 0.2)
##
## Selected variables:
## [1] 68 87 114 158 161
fdp(result$selected)
## [1] 0
In addition to using the predefined test statistics, it is also possible to use your own custom test statistics. To illustrate this functionality, we implement one of the simplest test statistics from the original knockoff filter paper, namely \[ W_j = \left|X_j^\top \cdot y\right| - \left|\tilde{X}_j^\top \cdot y\right|. \]
= function(X, X_k, y) {
my_knockoff_stat abs(t(X) %*% y) - abs(t(X_k) %*% y)
}= knockoff.filter(X, y, knockoffs = gaussian_knockoffs, statistic = my_knockoff_stat)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = gaussian_knockoffs,
## statistic = my_knockoff_stat)
##
## Selected variables:
## [1] 11 12 50 54 60 66 68 83 85 87 88 94 99 114 134 146 158 160 161
## [20] 166 177 179 181
fdp(result$selected)
## [1] 0.08695652
As another example, we show how to customize the grid of \(\lambda\)’s used to compute the lasso path in the default test statistic.
= function(...) stat.glmnet_coefdiff(..., nlambda=100)
my_lasso_stat = knockoff.filter(X, y, knockoffs = gaussian_knockoffs, statistic = my_lasso_stat)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = gaussian_knockoffs,
## statistic = my_lasso_stat)
##
## Selected variables:
## [1] 15 27 60 66 67 71 83 99 111 114 134 135 141 153 158 160 161 165 172
## [20] 177 179 186 193
fdp(result$selected)
## [1] 0
The nlambda
parameter is passed by stat.glmnet_coefdiff
to the glmnet
, which is used to compute the lasso path. For more information about this and other parameters, see the documentation for stat.glmnet_coefdiff
or glmnet.glmnet
.
In addition to using the predefined procedures for construction knockoff variables, it is also possible to create your own knockoffs. To illustrate this functionality, we implement a simple wrapper for the construction of second-order Model-X knockoffs.
= function(X) {
create_knockoffs create.second_order(X, shrink=T)
}= knockoff.filter(X, y, knockoffs=create_knockoffs)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = create_knockoffs)
##
## Selected variables:
## [1] 11 12 27 41 50 51 56 60 66 68 71 80 83 87 88 94 99 101 111
## [20] 112 114 132 134 135 140 141 142 146 150 152 153 156 158 160 161 164 165 166
## [39] 167 168 172 177 179 181 182 187 193
fdp(result$selected)
## [1] 0.06382979
The knockoff package supports two main styles of knockoff variables, semidefinite programming (SDP) knockoffs (the default) and equi-correlated knockoffs. Though more computationally expensive, the SDP knockoffs are statistically superior by having higher power. To create SDP knockoffs, this package relies on the R library [Rdsdp][Rdsdp] to efficiently solve the semidefinite program. In high-dimensional settings, this program becomes computationally intractable. A solution is then offered by approximate SDP (ASDP) knockoffs, which address this issue by solving a simpler relaxed problem based on a block-diagonal approximation of the covariance matrix. By default, the knockoff filter uses SDP knockoffs if \(p<500\) and ASDP knockoffs otherwise.
In this example we generate second-order Gaussian knockoffs using the estimated model parameters and the full SDP construction. Then, we run the knockoff filter as usual.
= function(X) create.second_order(X, method='sdp', shrink=T)
gaussian_knockoffs = knockoff.filter(X, y, knockoffs = gaussian_knockoffs)
result print(result)
## Call:
## knockoff.filter(X = X, y = y, knockoffs = gaussian_knockoffs)
##
## Selected variables:
## [1] 8 11 12 15 27 48 50 51 60 66 68 80 83 87 88 94 99 101 111
## [20] 112 114 132 134 135 140 141 146 150 152 153 158 160 161 164 165 166 167 168
## [39] 172 177 179 181 193
fdp(result$selected)
## [1] 0.04651163
If you want to look inside the knockoff filter, see the advanced vignette. If you want to see how to use knockoffs for Fixed-X variables, see the Fixed-X vignette.
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