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I have been trying to do unsupervised feature selection using LASSO (by removing class column). The dataset includes categorical (factor) and continuous (numeric) variables. Here is the link. I built a design matrix using model.matrix() which creates dummy variables for each level of the categorical variables.

dataset <- read.xlsx("./hepatitis.data.xlsx", sheet = "hepatitis", na.strings = "")
names_df <- names(dataset)
formula_LASSO <- as.formula(paste("~ 0 +", paste(names_df, collapse = " + ")))
LASSO_df <- model.matrix(object = formula_LASSO, data = dataset, contrasts.arg = lapply(dataset[ ,sapply(dataset, is.factor)], contrasts, contrasts = FALSE ))

### Group LASSO using gglasso package
gglasso_group <- c(1, 2, 2, 3, 3, 4, 4, 5, 5, 6, 6, 7, 7, 8, 8, 9, 9, 10, 10, 11, 11, 12, 12, 13, 13, 14, 15, 16, 17, 17)
fit <- gglasso(x = LASSO_df, y = y_k, group = gglasso_group, loss = "ls", intercept = FALSE, nlambda = 100)
# Cross validation
fit.cv <- cv.gglasso(x = LASSO_df, y = y_k, group = gglasso_group, nfolds = 10)
# Best lambda
best_lambda_fit.cv <- fit.cv$lambda.1se
# Final coefficients of variables
coefs = coef.gglasso(object = fit, s = best_lambda_fit.cv)

### Group LASSO with grpreg package
group_lasso <- grpreg(X = LASSO_df, y = y_k, group = gglasso_group, penalty = "grLasso")
plot(group_lasso)
cv_group_lasso <- cv.grpreg(X = LASSO_df, y = y_k, group = gglasso_group, penalty = "grLasso", se = "quick")
# Best lambda
best_lambda_group_lasso <- cv_group_lasso$lambda.min
coef_mat_group_lasso <- as.matrix(coef(cv_group_lasso))

If you check coefs and coef_mat_group_lasso, you will realize that they are not the same. Also, the best lambda values are not the same. I am not sure which one to choose for feature selection.

Any idea of how to remove intercept in grpreg() function? intercept = FALSE is not working.

Any help is appreciated. Thanks in advance.

1 Answer 1

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Please refer to the gglasso paper and the grpreg paper.

Different objective functions. On page 175 of grpreg paper, the author performs a step called group standardization, which normalizes the feature matrix within each group by right-multiplying an orthonormal matrix and a non-negative diagonal matrix. After the group lasso step with group standardization, the estimated coefficients are left-multiplied by the same matrices such that we obtain the coefficients of the original linear model. In such a way, however, the group lasso penalty is not equivalent to that without group standardization. For the detailed discussion, please also find it on page 175.

Different algorithms. The grpreg uses block coordinate descent, while gglasso uses an algorithm called groupwise-majorization-descent. It is natural to see small numerical differences when the algorithms are not the same.

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