On the Self-Penalization Phenomenon in Feature Selection
Abstract
We describe an implicit sparsity-inducing mechanism based on minimization over a family of kernels: equation* β, f~E[L(Y, f(β1/q X)] + λn \|f\|Hq2~~subject to~~β 0, equation* where L is the loss, is coordinate-wise multiplication and Hq is the reproducing kernel Hilbert space based on the kernel kq(x, x') = h(\|x-x'\|qq), where \|·\|q is the q norm. Using gradient descent to optimize this objective with respect to β leads to exactly sparse stationary points with high probability. The sparsity is achieved without using any of the well-known explicit sparsification techniques such as penalization (e.g., 1), early stopping or post-processing (e.g., clipping). As an application, we use this sparsity-inducing mechanism to build algorithms consistent for feature selection.
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