Measure-valued stochastic recurrences and the stability of queues
classification
🧮 math.PR
keywords
measure-valuedqueuestabilitystationarystochasticcasescharacterizingcondition
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In this paper we present a stability criterion for finite measure-valued stochastic recursions, generalizing Loynes's Theorem to spaces of measures. This result provides conditions for the reach of a "total stationary state" for the queue with an infinity of servers and the single-server SRPT queue. Indeed, we give in both cases a condition of existence of a stationary measure-valued recursive sequence characterizing the queueing system exhaustively.
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