Network Cache Design under Stationary Requests: Exact Analysis and Poisson Approximation
The design of caching algorithms to maximize hit probability has been extensively studied. In this paper, we associate each content with a utility, which is a function of either corresponding content hit rate or hit probability. We formulate a cache optimization problem to maximize the sum of utilities over all contents under stationary and ergodic request process, which is non-convex in general. We find that the problem can be reformulated as a convex optimization problem when the inter-request distribution has a non-increasing hazard rate function. We provide explicit optimal solutions for some inter-request distributions, and compare the solutions of the hit-rate based (HRB) and hit-probability based (HPB) problems. We also propose decentralized algorithms that can be implemented using limited information and are guaranteed to provide optimal solutions. We find that decentralized algorithms that solve HRB are more robust than decentralized HPB algorithms. Informed by these results, we further propose lightweight Poisson approximate decentralized and online algorithms that are accurate and efficient in achieving optimal hit rates and hit probabilities.
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