Group Sparse Additive Models
This work addresses variable selection in additive models for statistical learning, but it is incremental as it combines existing ideas of group sparsity and nonparametric methods.
The authors tackled the problem of sparse variable selection in nonparametric additive models by incorporating prior knowledge of covariate group structures to encourage joint selection, resulting in a method called GroupSpAM that substantially outperformed competing methods in simulation and real data experiments.
We consider the problem of sparse variable selection in nonparametric additive models, with the prior knowledge of the structure among the covariates to encourage those variables within a group to be selected jointly. Previous works either study the group sparsity in the parametric setting (e.g., group lasso), or address the problem in the non-parametric setting without exploiting the structural information (e.g., sparse additive models). In this paper, we present a new method, called group sparse additive models (GroupSpAM), which can handle group sparsity in additive models. We generalize the l1/l2 norm to Hilbert spaces as the sparsity-inducing penalty in GroupSpAM. Moreover, we derive a novel thresholding condition for identifying the functional sparsity at the group level, and propose an efficient block coordinate descent algorithm for constructing the estimate. We demonstrate by simulation that GroupSpAM substantially outperforms the competing methods in terms of support recovery and prediction accuracy in additive models, and also conduct a comparative experiment on a real breast cancer dataset.