Fluid and diffusion approximations of probabilistic matching systems

Büke, Burak; Chen, Hanyi

doi:10.1007/s11134-017-9516-3

Cited by 27 publications

(16 citation statements)

References 20 publications

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“…Bušić et al [7] generalize the bipartite matching model by dropping independence of arriving types and considering other matching policies. Büke and Chen [6] study a model where the matching policy is probabilistic. In their model, when a customer (or server) arrives in a system, it looks at the possible matches and, independently of everything else, selects one using a probability distribution.…”

Section: Motivation and Previous Workmentioning

confidence: 99%

“…There is also a positive probability of not finding any suitable server (customer), in which case it waits for a compatible server (customer). Büke and Chen [6] also consider models where the users are impatient and may depart if they are not matched by a certain time. An exact analysis of these models becomes quite intractable; Büke and Chen [6] study the fluid and diffusive scaling approximations of these systems.…”

Section: Motivation and Previous Workmentioning

confidence: 99%

“…Büke and Chen [6] also consider models where the users are impatient and may depart if they are not matched by a certain time. An exact analysis of these models becomes quite intractable; Büke and Chen [6] study the fluid and diffusive scaling approximations of these systems.…”

Section: Motivation and Previous Workmentioning

confidence: 99%

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On spatial matchings: The first-in-first-match case

Manjrekar

2021

Adv. Appl. Probab.

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We describe a process where two types of particles, marked red and blue, arrive in a domain at a constant rate. When a new particle arrives into the domain, if there are particles of the opposite color present within a distance of 1 from the new particle, then, among these particles, it matches to the one with the earliest arrival time, and both particles are removed. Otherwise, the particle is simply added to the system. Additionally, particles may lose patience and depart at a constant rate. We study the existence of a stationary regime for this process, when the domain is either a compact space or a Euclidean space. In the compact setting, we give a product-form characterization of the stationary distribution, and then prove an FKG-type inequality that establishes certain clustering properties of the particles in the steady state.

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Section: Motivation and Previous Workmentioning

confidence: 99%

Section: Motivation and Previous Workmentioning

confidence: 99%

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On spatial matchings: The first-in-first-match case

Manjrekar

2021

Adv. Appl. Probab.

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“…If the classes of items are partitioned into two subsets (say the classes of 'customers' and the classes of 'servers') and enter the system pairwise, as in the seminal papers [3,11] (which viewed such systems as generalizations of skill-based customer/server queueing systems) and then in [1], [2], [9], and [17], we say that the system is a bipartite stochastic matching model (BM). Stabilizing policies and fluid/diffusion approximations of two-sided systems are obtained respectively in [7,8]. Other references address specific models for designated applications: [5] on kidney transplants, [22] on housing allocations systems, and [21] on ride-sharing models.…”

Section: Introductionmentioning

confidence: 99%

A stochastic matching model on hypergraphs

Rahme

Moyal

2021

Adv. Appl. Probab.

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Motivated by applications to a wide range of areas, including assemble-to-order systems, operations scheduling, healthcare systems, and the collaborative economy, we study a stochastic matching model on hypergraphs, extending the model of Mairesse and Moyal (J. Appl. Prob.53, 2016) to the case of hypergraphical (rather than graphical) matching structures. We address a discrete-event system under a random input of single items, simply using the system as an interface to be matched in groups of two or more. We primarily study the stability of this model, for various hypergraph geometries.

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“…Typically, a customary rescaling procedure allows one to approximate the queue length process by a diffusion process, as indicated in Giorno et al [26]. Examples of diffusion models arising from heavy-traffic approximations of double-ended queues and of similar matching systems can be found in Liu et al [27] and Büke and Chen [28], respectively. In the case of queueing systems subject to catastrophes, a customary approach leads to jump-diffusion approximating processes (see, for instance, Di Crescenzo et al [29] and Dharmaraja et al [30]).…”

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confidence: 99%

A Time-Non-Homogeneous Double-Ended Queue with Failures and Repairs and Its Continuous Approximation

et al. 2018

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We consider a time-non-homogeneous double-ended queue subject to catastrophes and repairs. The catastrophes occur according to a non-homogeneous Poisson process and lead the system into a state of failure. Instantaneously, the system is put under repair, such that repair time is governed by a time-varying intensity function. We analyze the transient and the asymptotic behavior of the queueing system. Moreover, we derive a heavy-traffic approximation that allows approximating the state of the systems by a time-non-homogeneous Wiener process subject to jumps to a spurious state (due to catastrophes) and random returns to the zero state (due to repairs). Special attention is devoted to the case of periodic catastrophe and repair intensity functions. The first-passage-time problem through constant levels is also treated both for the queueing model and the approximating diffusion process. Finally, the goodness of the diffusive approximating procedure is discussed.

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Fluid and diffusion approximations of probabilistic matching systems

Cited by 27 publications

References 20 publications

On spatial matchings: The first-in-first-match case

On spatial matchings: The first-in-first-match case

A stochastic matching model on hypergraphs

A Time-Non-Homogeneous Double-Ended Queue with Failures and Repairs and Its Continuous Approximation

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