No-regret Caching via Online Mirror Descent

IF 0.7 Q4 COMPUTER SCIENCE, INFORMATION SYSTEMS

ACM Transactions on Modeling and Performance Evaluation of Computing Systems Pub Date : 2023-08-11 DOI:10.1145/3605209

Tareq Si Salem, Giovanni Neglia, Stratis Ioannidis

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引用次数: 0

Abstract

We study an online caching problem in which requests can be served by a local cache to avoid retrieval costs from a remote server. The cache can update its state after a batch of requests and store an arbitrarily small fraction of each file. We study no-regret algorithms based on Online Mirror Descent (OMD) strategies. We show that bounds for the regret crucially depend on the diversity of the request process, provided by the diversity ratio R/h , where R is the size of the batch and h is the maximum multiplicity of a request in a given batch. We characterize the optimality of OMD caching policies w.r.t. regret under different diversity regimes. We also prove that, when the cache must store the entire file, rather than a fraction, OMD strategies can be coupled with a randomized rounding scheme that preserves regret guarantees, even when update costs cannot be neglected. We provide a formal characterization of the rounding problem through optimal transport theory, and moreover we propose a computationally efficient randomized rounding scheme.

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无悔缓存通过在线镜像下降

我们研究了一个在线缓存问题，其中请求可以由本地缓存服务，以避免从远程服务器检索开销。缓存可以在一批请求后更新其状态，并存储每个文件的任意一小部分。研究了基于在线镜像下降(OMD)策略的无遗憾算法。我们表明，遗憾的界限关键取决于请求进程的多样性，由多样性比R/h提供，其中R是批处理的大小，h是给定批处理中请求的最大多重性。在不同的多样性制度下，我们描述了OMD缓存策略的最优性。我们还证明，当缓存必须存储整个文件而不是一小部分时，OMD策略可以与保留遗憾保证的随机舍入方案相结合，即使在更新成本不能忽略的情况下也是如此。通过最优传输理论给出了舍入问题的形式化表征，并提出了一种计算效率高的随机舍入方案。

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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来源期刊

ACM Transactions on Modeling and Performance Evaluation of Computing Systems COMPUTER SCIENCE, INFORMATION SYSTEMS-

CiteScore

2.10

自引率

0.00%

发文量