2012
DOI: 10.1214/10-ssy012
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Spectral gap of the Erlang A model in the Halfin-Whitt regime

Abstract: We consider a hybrid diffusion process that is a combination of two Ornstein-Uhlenbeck processes with different restraining forces. This process serves as the heavy-traffic approximation to the Markovian many-server queue with abandonments in the critical HalfinWhitt regime. We obtain an expression for the Laplace transform of the time-dependent probability distribution, from which the spectral gap is explicitly characterized. The spectral gap gives the exponential rate of convergence to equilibrium. We furthe… Show more

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Cited by 11 publications
(17 citation statements)
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“…In this limit we can approximate the contour integrals , , and by simpler special functions, namely parabolic cylinder functions. We discuss this limit in detail in van Leeuwaarden and Knessl (2011) for the M  /  M  /  m model with , and in Leeuwaarden and Knessl (2012) for the model with . We can obtain then where P will satisfy a parabolic PDE, which we explicitly solved in van Leeuwaarden and Knessl (2011), Leeuwaarden and Knessl (2012).…”
Section: Transient Distributionmentioning
confidence: 99%
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“…In this limit we can approximate the contour integrals , , and by simpler special functions, namely parabolic cylinder functions. We discuss this limit in detail in van Leeuwaarden and Knessl (2011) for the M  /  M  /  m model with , and in Leeuwaarden and Knessl (2012) for the model with . We can obtain then where P will satisfy a parabolic PDE, which we explicitly solved in van Leeuwaarden and Knessl (2011), Leeuwaarden and Knessl (2012).…”
Section: Transient Distributionmentioning
confidence: 99%
“…We discuss this limit in detail in van Leeuwaarden and Knessl (2011) for the M  /  M  /  m model with , and in Leeuwaarden and Knessl (2012) for the model with . We can obtain then where P will satisfy a parabolic PDE, which we explicitly solved in van Leeuwaarden and Knessl (2011), Leeuwaarden and Knessl (2012). An alternate approach is to evaluate Theorems 1 and 2, or Corollary 3 in the limit in (2.104), and thus identify P ( x ,  t ) directly.…”
Section: Transient Distributionmentioning
confidence: 99%
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“…Now consider an asymptotic regime where the number of servers grows large, and additionally assume that N − λ(N) √ N → β as N → ∞ for some positive coefficient β > 0, i.e., the load per server approaches unity as 1 − β/ √ N. In terms of the aggregate traffic load and total service capacity, this scaling corresponds to the socalled Halfin-Whitt heavy-traffic regime which was introduced in the seminal paper [12] and has been extensively studied since. The set-up in [12], as well as the numerous model extensions in the literature (see [8,9,10,12,23,24,25], and the references therein), primarily considered a single centralized queue and server pool (M/M/N), rather than a scenario with parallel queues. Eschenfeldt and Gamarnik [7] initiated the study of the scaling behavior for parallel-server systems in the Halfin-Whitt heavy-traffic regime.…”
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confidence: 99%