Stationary Waiting Time Distributions in the GI/PH/1 Queue.

Abstract

It is known that the stable GI/PH/i queue has an embedded Markov chain whose invariant probability vector is matrix-geometric with a rate matrix R. In terms of the matrix R, the stationary waiting time distributions at arrivals, at an arbitrary time point and until the customer's departure may be evaluated by solving finite, highly structured systems of linear differential equations with constant coefficients. Asymptotic results, useful in truncating the computations, are also obtained. The queue is assumed to follow the first-come, first-served discipline. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Mar 01, 1980
Accession Number
ADA089872

Entities

People

  • Marcel F. Neuts

Organizations

  • University of Delaware

Tags

DTIC Thesaurus Topics

  • Algorithms
  • Applied Mathematics
  • Coefficients
  • Computations
  • Differential Equations
  • Eigenvalues
  • Eigenvectors
  • Equations
  • Identities
  • Mathematical Analysis
  • Mathematics
  • Numerical Integration
  • Probability
  • Probability Distributions
  • Stationary

Fields of Study

  • Mathematics

Readers

  • Calculus or Mathematical Analysis
  • Mathematical Modeling and Probability Theory.