Accelerate the Warm-up Stage in the Lasso Computation via a Homotopic Approach

Abstract

In optimization, it is known that when the objective functions are strictly convex and well-conditioned, gradient-based approaches can be extremely effective, e.g., achieving the exponential rate of convergence. On the other hand, the existing Lasso-type estimator in general cannot achieve the optimal rate due to the undesirable behavior of the absolute function at the origin. A homotopic method is to use a sequence of surrogate functions to approximate the 1 penalty that is used in the Lasso-type of estimators. The surrogate functions will converge to the 1 penalty in the Lasso estimator. At the same time, each surrogate function is strictly convex, which enables a provable faster numerical rate of convergence. In this paper, we demonstrate that by meticulously defining the surrogate functions, one can prove a faster numerical convergence rate than any existing methods in computing for the Lasso-type of estimators. Namely, the state-of-the-art algorithms can only guarantee O(1/ε) or O(1/ε) convergence rates, while we can prove an O([(1/ε)]2) for the newly proposed algorithm. Our numerical simulations show that the new algorithm also performs better empirically.