Jérôme Bolte, Cyrille W. Combettes, Edouard Pauwels
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引用次数: 0
摘要
弗兰克-沃尔夫算法是在紧凑凸集上最小化光滑凸函数 f 的常用方法[公式:见正文]。虽然许多收敛结果都是根据函数值推导出来的,但对迭代序列的收敛行为几乎一无所知[公式:见正文]。在通常的假设条件下,我们设计了几个反例来证明 f 为 d 时连续可微分的[公式:见正文]、[公式:见正文]和[公式:见正文]的收敛性。我们的反例涵盖了开环、闭环和线性搜索步长策略的情况,并且适用于任何线性最小化神谕的选择,从而证明了[公式:见正文]收敛行为的基本病理:作者感谢人工智能跨学科研究所ANITI通过法国国家研究署(ANR)协议下的 "未来投资-PIA3 "计划[赠款ANR-19-PI3A0004]、美国空军材料司令部空军科学研究办公室[赠款FA866-22-1-7012和ANR MaSDOL 19-CE23-0017-0]、ANR国际象棋[赠款ANR-17-EURE-0010]、ANR Regulia和拉格朗日中心提供的资助。
The Iterates of the Frank–Wolfe Algorithm May Not Converge
The Frank–Wolfe algorithm is a popular method for minimizing a smooth convex function f over a compact convex set [Formula: see text]. Whereas many convergence results have been derived in terms of function values, almost nothing is known about the convergence behavior of the sequence of iterates [Formula: see text]. Under the usual assumptions, we design several counterexamples to the convergence of [Formula: see text], where f is d-time continuously differentiable, [Formula: see text], and [Formula: see text]. Our counterexamples cover the cases of open-loop, closed-loop, and line-search step-size strategies and work for any choice of the linear minimization oracle, thus demonstrating the fundamental pathologies in the convergence behavior of [Formula: see text].Funding: The authors acknowledge the support of the AI Interdisciplinary Institute ANITI funding through the French “Investments for the Future – PIA3” program under the Agence Nationale de la Recherche (ANR) agreement [Grant ANR-19-PI3A0004], the Air Force Office of Scientific Research, Air Force Material Command, U.S. Air Force [Grants FA866-22-1-7012 and ANR MaSDOL 19-CE23-0017-0], ANR Chess [Grant ANR-17-EURE-0010], ANR Regulia, and Centre Lagrange.
期刊介绍:
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