View source: R/gpOptimizationInterfaceCpp.R
gpElasticNetCpp | R Documentation |
Implements elastic net regularization for general purpose optimization problems with C++ functions. The penalty function is given by:
p( x_j) = p( x_j) = \frac{1}{w_j}\lambda| x_j|
Note that the elastic net combines ridge and lasso regularization. If \alpha = 0
,
the elastic net reduces to ridge regularization. If \alpha = 1
it reduces
to lasso regularization. In between, elastic net is a compromise between the shrinkage of
the lasso and the ridge penalty.
gpElasticNetCpp(
par,
regularized,
fn,
gr,
lambdas,
alphas,
additionalArguments,
method = "glmnet",
control = lessSEM::controlGlmnet()
)
par |
labeled vector with starting values |
regularized |
vector with names of parameters which are to be regularized. |
fn |
R function which takes the parameters AND their labels as input and returns the fit value (a single value) |
gr |
R function which takes the parameters AND their labels as input and returns the gradients of the objective function. If set to NULL, numDeriv will be used to approximate the gradients |
lambdas |
numeric vector: values for the tuning parameter lambda |
alphas |
numeric vector with values of the tuning parameter alpha. Must be between 0 and 1. 0 = ridge, 1 = lasso. |
additionalArguments |
list with additional arguments passed to fn and gr |
method |
which optimizer should be used? Currently implemented are ista and glmnet. |
control |
used to control the optimizer. This element is generated with the controlIsta and controlGlmnet functions. See ?controlIsta and ?controlGlmnet for more details. |
The interface is inspired by optim, but a bit more restrictive. Users have to supply a vector with starting values (important: This vector must have labels), a fitting function, and a gradient function. These fitting functions must take an const Rcpp::NumericVector& with parameter values as first argument and an Rcpp::List& as second argument
Elastic net regularization:
Zou, H., & Hastie, T. (2005). Regularization and variable selection via the elastic net. Journal of the Royal Statistical Society: Series B, 67(2), 301–320. https://doi.org/10.1111/j.1467-9868.2005.00503.x
For more details on GLMNET, see:
Friedman, J., Hastie, T., & Tibshirani, R. (2010). Regularization Paths for Generalized Linear Models via Coordinate Descent. Journal of Statistical Software, 33(1), 1–20. https://doi.org/10.18637/jss.v033.i01
Yuan, G.-X., Chang, K.-W., Hsieh, C.-J., & Lin, C.-J. (2010). A Comparison of Optimization Methods and Software for Large-scale L1-regularized Linear Classification. Journal of Machine Learning Research, 11, 3183–3234.
Yuan, G.-X., Ho, C.-H., & Lin, C.-J. (2012). An improved GLMNET for l1-regularized logistic regression. The Journal of Machine Learning Research, 13, 1999–2030. https://doi.org/10.1145/2020408.2020421
For more details on ISTA, see:
Beck, A., & Teboulle, M. (2009). A Fast Iterative Shrinkage-Thresholding Algorithm for Linear Inverse Problems. SIAM Journal on Imaging Sciences, 2(1), 183–202. https://doi.org/10.1137/080716542
Gong, P., Zhang, C., Lu, Z., Huang, J., & Ye, J. (2013). A General Iterative Shrinkage and Thresholding Algorithm for Non-convex Regularized Optimization Problems. Proceedings of the 30th International Conference on Machine Learning, 28(2)(2), 37–45.
Parikh, N., & Boyd, S. (2013). Proximal Algorithms. Foundations and Trends in Optimization, 1(3), 123–231.
Object of class gpRegularized
# This example shows how to use the optimizers
# for C++ objective functions. We will use
# a linear regression as an example. Note that
# this is not a useful application of the optimizers
# as there are specialized packages for linear regression
# (e.g., glmnet)
library(Rcpp)
library(lessSEM)
linreg <- '
// [[Rcpp::depends(RcppArmadillo)]]
#include <RcppArmadillo.h>
// [[Rcpp::export]]
double fitfunction(const Rcpp::NumericVector& parameters, Rcpp::List& data){
// extract all required elements:
arma::colvec b = Rcpp::as<arma::colvec>(parameters);
arma::colvec y = Rcpp::as<arma::colvec>(data["y"]); // the dependent variable
arma::mat X = Rcpp::as<arma::mat>(data["X"]); // the design matrix
// compute the sum of squared errors:
arma::mat sse = arma::trans(y-X*b)*(y-X*b);
// other packages, such as glmnet, scale the sse with
// 1/(2*N), where N is the sample size. We will do that here as well
sse *= 1.0/(2.0 * y.n_elem);
// note: We must return a double, but the sse is a matrix
// To get a double, just return the single value that is in
// this matrix:
return(sse(0,0));
}
// [[Rcpp::export]]
arma::rowvec gradientfunction(const Rcpp::NumericVector& parameters, Rcpp::List& data){
// extract all required elements:
arma::colvec b = Rcpp::as<arma::colvec>(parameters);
arma::colvec y = Rcpp::as<arma::colvec>(data["y"]); // the dependent variable
arma::mat X = Rcpp::as<arma::mat>(data["X"]); // the design matrix
// note: we want to return our gradients as row-vector; therefore,
// we have to transpose the resulting column-vector:
arma::rowvec gradients = arma::trans(-2.0*X.t() * y + 2.0*X.t()*X*b);
// other packages, such as glmnet, scale the sse with
// 1/(2*N), where N is the sample size. We will do that here as well
gradients *= (.5/y.n_rows);
return(gradients);
}
// Dirk Eddelbuettel at
// https://gallery.rcpp.org/articles/passing-cpp-function-pointers/
typedef double (*fitFunPtr)(const Rcpp::NumericVector&, //parameters
Rcpp::List& //additional elements
);
typedef Rcpp::XPtr<fitFunPtr> fitFunPtr_t;
typedef arma::rowvec (*gradientFunPtr)(const Rcpp::NumericVector&, //parameters
Rcpp::List& //additional elements
);
typedef Rcpp::XPtr<gradientFunPtr> gradientFunPtr_t;
// [[Rcpp::export]]
fitFunPtr_t fitfunPtr() {
return(fitFunPtr_t(new fitFunPtr(&fitfunction)));
}
// [[Rcpp::export]]
gradientFunPtr_t gradfunPtr() {
return(gradientFunPtr_t(new gradientFunPtr(&gradientfunction)));
}
'
Rcpp::sourceCpp(code = linreg)
ffp <- fitfunPtr()
gfp <- gradfunPtr()
N <- 100 # number of persons
p <- 10 # number of predictors
X <- matrix(rnorm(N*p), nrow = N, ncol = p) # design matrix
b <- c(rep(1,4),
rep(0,6)) # true regression weights
y <- X%*%matrix(b,ncol = 1) + rnorm(N,0,.2)
data <- list("y" = y,
"X" = cbind(1,X))
parameters <- rep(0, ncol(data$X))
names(parameters) <- paste0("b", 0:(length(parameters)-1))
en <- gpElasticNetCpp(par = parameters,
regularized = paste0("b", 1:(length(b)-1)),
fn = ffp,
gr = gfp,
lambdas = seq(0,1,.1),
alphas = c(0,.5,1),
additionalArguments = data)
en@parameters
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