Occupancy distributions of homogeneous queueing systems under opportunistic scheduling

Abstract

We analyze opportunistic schemes for transmission scheduling from one of n homogeneous queues whose channel states fluctuate independently. Considered schemes consist of the LCQ policy, which transmits from a longest connected queue in the entire system, and its low-complexity variants that transmit from a longest queue within a randomly chosen subset of connected queues. A Markovian model is studied where mean packet transmission time is n-1 and packet arrival rate is λ<1 per queue. Transient and equilibrium distributions of queue occupancies are obtained in the limit as the system size n tends to infinity.