修剪套索:稀疏恢复保证和广义软最小惩罚的实际优化

IF 1.9 Q1 MATHEMATICS, APPLIED SIAM journal on mathematics of data science Pub Date : 2020-05-18 DOI:10.1137/20M1330634
Tal Amir, R. Basri, B. Nadler
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引用次数: 11

摘要

我们提出了一种新的方法来解决稀疏逼近或最佳子集选择问题,即找到一个最小化$\ell_2$残差$\lVert A{\bf x}-{\bf y} \rVert_2$的$k$ -稀疏向量${\bf x}\in\mathbb{R}^d$。我们考虑一种正则化的方法,其中这个残差被非凸$\textit{trimmed lasso}$惩罚,定义为${\bf x}$的$\ell_1$ -范数,不包括其$k$最大的项。我们证明了修剪套索具有几个吸引人的理论性质,特别是在惩罚目标成功优化的前提下,推导了稀疏恢复保证。接下来,我们将通过经验证明,直接优化这一目标非常具有挑战性。相反,我们建议为修剪过的套索提供一个代理,称为$\textit{generalized soft-min}$。这个惩罚平滑地在经典套索和裁剪套索之间插入,同时考虑到所有可能的$k$ -稀疏模式。广义软最小惩罚涉及$\binom{d}{k}$项的求和,但我们推导了一个多项式时间算法来计算它。这反过来又为原始稀疏逼近问题提供了一种实用的方法。通过模拟,我们展示了与当前最先进的技术相比,其具有竞争力的性能。
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The Trimmed Lasso: Sparse Recovery Guarantees and Practical Optimization by the Generalized Soft-Min Penalty
We present a new approach to solve the sparse approximation or best subset selection problem, namely find a $k$-sparse vector ${\bf x}\in\mathbb{R}^d$ that minimizes the $\ell_2$ residual $\lVert A{\bf x}-{\bf y} \rVert_2$. We consider a regularized approach, whereby this residual is penalized by the non-convex $\textit{trimmed lasso}$, defined as the $\ell_1$-norm of ${\bf x}$ excluding its $k$ largest-magnitude entries. We prove that the trimmed lasso has several appealing theoretical properties, and in particular derive sparse recovery guarantees assuming successful optimization of the penalized objective. Next, we show empirically that directly optimizing this objective can be quite challenging. Instead, we propose a surrogate for the trimmed lasso, called the $\textit{generalized soft-min}$. This penalty smoothly interpolates between the classical lasso and the trimmed lasso, while taking into account all possible $k$-sparse patterns. The generalized soft-min penalty involves summation over $\binom{d}{k}$ terms, yet we derive a polynomial-time algorithm to compute it. This, in turn, yields a practical method for the original sparse approximation problem. Via simulations, we demonstrate its competitive performance compared to current state of the art.
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