平滑在线优化与不可靠的预测

Q4 Computer Science Performance Evaluation Review Pub Date : 2023-06-26 DOI:10.1145/3606376.3593570

Daan Rutten, Nicolas Christianson, Debankur Mukherjee, Adam Wierman

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引用次数: 0

摘要

我们考虑在赋范向量空间(X， ||·|)中具有切换代价的在线优化问题，其中，在每次时刻t，决策者观察到一个非凸命中代价函数f: t X→[0，∞]，并且必须决定某个xt∈X→，支付ƒt (xt) + || xt-xt-1||，其中||·||表示切换代价。在整个过程中，我们假设ƒt是全局α-多面体，即ƒt有一个唯一的最小值 t∈X，并且对于所有X∈X, f t) (X)≥ƒt + α·|| X - υt。此外，我们假设决策者在每一轮中都可以获得最优决策的不可信预测xt，例如由黑盒AI工具建议的决策。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Smoothed Online Optimization with Unreliable Predictions

We consider online optimization with switching costs in a normed vector space (X, ||·||) wherein, at each time t, a decision maker observes a non-convex hitting cost function ƒ : t X →[0, ∞] and must decide upon some xt∈X→, paying ƒt (xt) + || xt-xt-1||, where ||·|| characterizes the switching cost. Throughout, we assume that ƒt is globally α-polyhedral, i.e., ƒt has a unique minimizer υt ∈X, and, for all x ∈ X, ƒ t) (x) ≥ ƒt + α · ||x - υ t. Moreover, we assume that the decision maker has access to an untrusted prediction xt of the optimal decision during each round, such as the decision suggested by a black-box AI tool.

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