Complexity of Unconstrained L2-Lp Minimization

Abstract

We consider the unconstrained L2-Lp minimization: find a minimizer of \|Ax-b\|22+λ \|x\|pp for given A ∈ Rm× n, b∈ Rm and parameters λ>0, p∈ [0,1). This problem has been studied extensively in variable selection and sparse least squares fitting for high dimensional data. Theoretical results show that the minimizers of the L2-Lp problem have various attractive features due to the concavity and non-Lipschitzian property of the regularization function \|·\|pp. In this paper, we show that the Lq-Lp minimization problem is strongly NP-hard for any p∈ [0,1) and q 1, including its smoothed version. On the other hand, we show that, by choosing parameters (p,λ) carefully, a minimizer, global or local, will have certain desired sparsity. We believe that these results provide new theoretical insights to the studies and applications of the concave regularized optimization problems.