646 research outputs found
An Inexact Successive Quadratic Approximation Method for Convex L-1 Regularized Optimization
We study a Newton-like method for the minimization of an objective function
that is the sum of a smooth convex function and an l-1 regularization term.
This method, which is sometimes referred to in the literature as a proximal
Newton method, computes a step by minimizing a piecewise quadratic model of the
objective function. In order to make this approach efficient in practice, it is
imperative to perform this inner minimization inexactly. In this paper, we give
inexactness conditions that guarantee global convergence and that can be used
to control the local rate of convergence of the iteration. Our inexactness
conditions are based on a semi-smooth function that represents a (continuous)
measure of the optimality conditions of the problem, and that embodies the
soft-thresholding iteration. We give careful consideration to the algorithm
employed for the inner minimization, and report numerical results on two test
sets originating in machine learning
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