Statistical mechanics of sparse generalization and model selection

Abstract

One of the crucial tasks in many inference problems is the extraction of sparse information out of a given number of high-dimensional measurements. In machine learning, this is frequently achieved using, as a penality term, the Lp norm of the model parameters, with p≤ 1 for efficient dilution. Here we propose a statistical-mechanics analysis of the problem in the setting of perceptron memorization and generalization. Using a replica approach, we are able to evaluate the relative performance of naive dilution (obtained by learning without dilution, following by applying a threshold to the model parameters), L1 dilution (which is frequently used in convex optimization) and L0 dilution (which is optimal but computationally hard to implement). Whereas both Lp diluted approaches clearly outperform the naive approach, we find a small region where L0 works almost perfectly and strongly outperforms the simpler to implement L1 dilution.