2013
DOI: 10.1214/12-aap889
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On the rate of convergence to stationarity of the M/M/N queue in the Halfin–Whitt regime

Abstract: We prove several results about the rate of convergence to stationarity, that is, the spectral gap, for the M/M/n queue in the Halfin-Whitt regime. We identify the limiting rate of convergence to steady-state, and discover an asymptotic phase transition that occurs w.r.t. this rate. In particular, we demonstrate the existence of a constant B * ≈ 1.85772 s.t. when a certain excess parameter B ∈ (0, B * ], the error in the steady-state approximation converges exponentially fast to zero at rate B 2 4 . For B > B *… Show more

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Cited by 26 publications
(32 citation statements)
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“…By expanding (14) for β → −∞ and (167) as η → 0 we see that the two agree in this intermediate limit. Thus for β large and negative, r is exponentially close to η, as could be expected since then almost all of the probability mass in the model migrates to the range x > 0.…”
Section: Proofs Of Propositions 6 Andmentioning
confidence: 74%
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“…By expanding (14) for β → −∞ and (167) as η → 0 we see that the two agree in this intermediate limit. Thus for β large and negative, r is exponentially close to η, as could be expected since then almost all of the probability mass in the model migrates to the range x > 0.…”
Section: Proofs Of Propositions 6 Andmentioning
confidence: 74%
“…The mean hitting time of the Halfin-Whitt diffusion was obtained in Maglaras and Zeevi [25]. Gamarnik and Goldberg [14] were the first to identify the spectral gap of the M/M/s system, asymptotically in the Halfin-Whitt regime.…”
mentioning
confidence: 99%
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“…When β becomes small, both (14) and (18) become invalid, as the correction terms become larger than the leading term. Then a separate analysis leads to the following result.…”
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confidence: 99%