The study of greedy approximation in the context of convex optimization is becoming a promising research direction as greedy algorithms are actively being employed to construct sparse minimizers for convex functions with respect to given sets of elements. In this paper we propose a unified way of analyzing a certain kind of greedy-type algorithms for the minimization of convex functions on Banach spaces. Specifically, we define the class of Weak Biorthogonal Greedy Algorithms for convex optimization that contains a wide range of greedy algorithms. We analyze the introduced class of algorithms and establish the properties of convergence, rate of convergence, and numerical stability, which is understood in the sense that the steps of the algorithm are allowed to be performed not precisely but with controlled computational inaccuracies. We show that the following well-known algorithms for convex optimization -- the Weak Chebyshev Greedy Algorithm (co) and the Weak Greedy Algorithm with Free Relaxation (co) -- belong to this class, and introduce a new algorithm -- the Rescaled Weak Relaxed Greedy Algorithm (co). Presented numerical experiments demonstrate the practical performance of the aforementioned greedy algorithms in the setting of convex minimization as compared to optimization with regularization, which is the conventional approach of constructing sparse minimizers.
翻译:在Convex优化背景下对贪婪近似的研究正在成为一个大有希望的研究方向,因为贪婪算法正在积极用于构建稀少的最小化器,用于对特定元素组群的精密功能。 在本文中,我们提出一种统一的方法来分析某种贪婪类型的算法,以最大限度地减少Banach空间的精密功能。具体地说,我们定义了含有多种贪婪算法的精细精密近似近似值类,我们分析了引入的算法类别,并建立了趋同、趋同率和数字稳定性的特性,这是人们理解的,即算法的步骤可以不精确地进行,而是有控制的计算不准确的不精确。我们表明,以下众所周知的精细细细的精密算法,Weak Chebyshev Greedy Algorithmsm (co) 和Weak Greedy Algorithm(co) 与自由放松算法(co) 属于这一类,并引入一种新的算法 -- Rescald Weak Reskid Weak Relaveriveled strimal laftal lagal) 的最小化方法,以展示了稳定的精细化的精化的精化的精化的精制。