Inexact Fixed-Point Proximity Algorithm for the $$\ell _0$$ Sparse Regularization Problem

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Ronglong Fang, Yuesheng Xu, Mingsong Yan
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Abstract

We study inexact fixed-point proximity algorithms for solving a class of sparse regularization problems involving the \(\ell _0\) norm. Specifically, the \(\ell _0\) model has an objective function that is the sum of a convex fidelity term and a Moreau envelope of the \(\ell _0\) norm regularization term. Such an \(\ell _0\) model is non-convex. Existing exact algorithms for solving the problems require the availability of closed-form formulas for the proximity operator of convex functions involved in the objective function. When such formulas are not available, numerical computation of the proximity operator becomes inevitable. This leads to inexact iteration algorithms. We investigate in this paper how the numerical error for every step of the iteration should be controlled to ensure global convergence of the inexact algorithms. We establish a theoretical result that guarantees the sequence generated by the proposed inexact algorithm converges to a local minimizer of the optimization problem. We implement the proposed algorithms for three applications of practical importance in machine learning and image science, which include regression, classification, and image deblurring. The numerical results demonstrate the convergence of the proposed algorithm and confirm that local minimizers of the \(\ell _0\) models found by the proposed inexact algorithm outperform global minimizers of the corresponding \(\ell _1\) models, in terms of approximation accuracy and sparsity of the solutions.

Abstract Image

$$ell _0$$ 稀疏正则化问题的非精确定点邻近算法
我们研究了解决一类涉及 \(\ell _0\) 规范的稀疏正则化问题的非精确定点邻近算法。具体来说,\(ell _0\)模型的目标函数是一个凸保真项和\(ell _0\)规范正则项的莫劳包络之和。这样的 \(\ell _0\) 模型是非凸的。解决这些问题的现有精确算法需要目标函数中涉及的凸函数接近算子的闭式公式。如果没有这样的公式,就不可避免地要对邻近算子进行数值计算。这就导致了不精确的迭代算法。本文研究了如何控制迭代每一步的数值误差,以确保非精确算法的全局收敛性。我们建立了一个理论结果,保证所提出的非精确算法生成的序列能收敛到优化问题的局部最小值。我们针对机器学习和图像科学中三个具有实际重要性的应用实现了所提出的算法,包括回归、分类和图像去模糊。数值结果证明了所提算法的收敛性,并证实了所提非精确算法找到的 \(ell _0\) 模型的局部最小值在近似精度和解的稀疏性方面优于相应 \(ell _1\) 模型的全局最小值。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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