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GUEs and queues
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  • Published: February 2001

GUEs and queues

  • Yu. Baryshnikov1 

Probability Theory and Related Fields volume 119, pages 256–274 (2001)Cite this article

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Abstract.

Consider the process D k , k = 1,2,…, given by

B i being independent standard Brownian motions. This process describes the limiting behavior “near the edge” in queues in series, totally asymmetric exclusion processes or oriented percolation. The problem of finding the distribution of D. was posed in [GW]. The main result of this paper is that the process D. has the law of the process of the largest eigenvalues of the main minors of an infinite random matrix drawn from Gaussian Unitary Ensemble.

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Authors and Affiliations

  1. LAMA, UVSQ, Bâtiment Fermat, 45, avenue États-Unis, 78035 Versailles, France. e-mail: yuliyb@math.uvsq.fr, , , , , , FR

    Yu. Baryshnikov

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  1. Yu. Baryshnikov
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Received: 17 November 1999 / Revised version: 4 April 2000 / Published online: 24 January 2000

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Baryshnikov, Y. GUEs and queues. Probab Theory Relat Fields 119, 256–274 (2001). https://doi.org/10.1007/PL00008760

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  • Issue Date: February 2001

  • DOI: https://doi.org/10.1007/PL00008760

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Keywords

  • Brownian Motion
  • Random Matrix
  • Large Eigenvalue
  • Exclusion Process
  • Standard Brownian Motion
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