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Autori principali: Luo, Yishun, Zubeldia, Martin
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2510.14284
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author Luo, Yishun
Zubeldia, Martin
author_facet Luo, Yishun
Zubeldia, Martin
contents We consider a load balancing system consisting of $n$ single-server queues working in parallel, with heterogeneous service rates. Jobs arrive to a central dispatcher, which has to dispatch them to one of the queues immediately upon arrival. For this setting, we consider a broad family of policies where the dispatcher can only access the queue lengths sporadically, every $T$ units of time. We assume that the dispatching decisions are made based only on the order of the scaled queue lengths at the last time that the queues were accessed, and on the processing rate of each server. For these general policies, we provide easily verifiable necessary and sufficient conditions for the stability of the system, and sufficient conditions for heavy-traffic delay optimality. We also show that, in heavy-traffic, the queue length converges in distribution to a scaled deterministic vector, where the scaling factor is an exponential random variable.
format Preprint
id arxiv_https___arxiv_org_abs_2510_14284
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Stability and Heavy-traffic Delay Optimality of General Load Balancing Policies in Heterogeneous Service Systems
Luo, Yishun
Zubeldia, Martin
Performance
Probability
We consider a load balancing system consisting of $n$ single-server queues working in parallel, with heterogeneous service rates. Jobs arrive to a central dispatcher, which has to dispatch them to one of the queues immediately upon arrival. For this setting, we consider a broad family of policies where the dispatcher can only access the queue lengths sporadically, every $T$ units of time. We assume that the dispatching decisions are made based only on the order of the scaled queue lengths at the last time that the queues were accessed, and on the processing rate of each server. For these general policies, we provide easily verifiable necessary and sufficient conditions for the stability of the system, and sufficient conditions for heavy-traffic delay optimality. We also show that, in heavy-traffic, the queue length converges in distribution to a scaled deterministic vector, where the scaling factor is an exponential random variable.
title Stability and Heavy-traffic Delay Optimality of General Load Balancing Policies in Heterogeneous Service Systems
topic Performance
Probability
url https://arxiv.org/abs/2510.14284