N. K. Krivulin
Published 2012-12-20Version 1
We consider (max,+)-algebra products of random matrices, which arise from performance evaluation of acyclic fork-join queueing networks. A new algebraic technique to examine properties of the product and investigate its limiting behaviour is proposed based on an extension of the standard matrix (max,+)-algebra by endowing it with the ordinary matrix addition as an external operation. As an application, we derive bounds on the (max,+)-algebra maximal Lyapunov exponent which can be considered as the cycle time of the networks.
Comments: Simulation 2001: St. Petersburg Workshop on Simulation, St. Petersburg, Russia, June 18-22, 2001. ISBN 5-7997-0304-9
Journal: Proc. 4th St. Petersburg Workshop on Simulation, 2001, pp. 304-309
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