A L\'evy input fluid queue with input and workload regulation

Abstract

We consider a queuing model with the workload evolving between consecutive i.i.d.\ exponential timers \eq(i)\i=1,2,... according to a spectrally positive L\'evy process Yi(t) that is reflected at zero, and where the environment i equals 0 or 1. When the exponential clock eq(i) ends, the workload, as well as the L\'evy input process, are modified; this modification may depend on the current value of the workload, the maximum and the minimum workload observed during the previous cycle, and the environment i of the L\'evy input process itself during the previous cycle. We analyse the steady-state workload distribution for this model. The main theme of the analysis is the systematic application of non-trivial functionals, derived within the framework of fluctuation theory of L\'evy processes, to workload and queuing models.