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Scientific publications
Чиркова Ю.В.
Оптимальные обращения к 2-серверной системе с потерями и случайным доступом
// Математическая Теория Игр и ее Приложения, т. 7, в. 3. 2015. C. 79-111
Keywords: Queueing System, Optimal Arrivals, Nash equilibrium
We consider the 2-server queuing system with loss that admits requests during a time interval
[0, T]. Players try to send their requests
to the system, that provides a random access to its servers with some probabilities, and players know these probabilities. We consider a noncooperative game for this queuing system. Each player’s strategy is a time moment to send his request to the system trying to maximize the probability of successful service obtaining. We use a symmetric Nash
equilibrium as an optimality criteria. Two models are considered for this game. In the first model the number of players is deterministic. In the second it follows a Poisson distribution. We prove that there
exists a unique symmetric equilibrium for both models. Also we compare numerically equilibria for different models’ parameters.
[0, T]. Players try to send their requests
to the system, that provides a random access to its servers with some probabilities, and players know these probabilities. We consider a noncooperative game for this queuing system. Each player’s strategy is a time moment to send his request to the system trying to maximize the probability of successful service obtaining. We use a symmetric Nash
equilibrium as an optimality criteria. Two models are considered for this game. In the first model the number of players is deterministic. In the second it follows a Poisson distribution. We prove that there
exists a unique symmetric equilibrium for both models. Also we compare numerically equilibria for different models’ parameters.
Indexed at Web of Science, RSCI
vo7-3_79-111_chirkova.pdf (850 Kb, total downloads: 159)
Last modified: April 28, 2016