Space-efficient scheduling of stochastically generated tasks

Abstract

We study the problem of scheduling tasks for execution by a processor when the tasks can stochastically generate new tasks. Tasks can be of different types, and each type has a fixed, known probability of generating other tasks. We present results on the random variable Ssigma modeling the maximal space needed by the processor to store the currently active tasks when acting under the scheduler sigma. We obtain tail bounds for the distribution of Ssigma for both offline and online schedulers, and investigate the expected value of Ssigma.