An Optimal Control Framework for Online Job Scheduling with General Cost Functions

Abstract

We consider the problem of online job scheduling on a single machine or multiple unrelated machines with general job/machine-dependent cost functions. In this model, each job j has a processing requirement (length) vij and arrives with a nonnegative nondecreasing cost function gij(t) if it has been dispatched to machine i, and this information is revealed to the system upon arrival of job j at time rj. The goal is to dispatch the jobs to the machines in an online fashion and process them preemptively on the machines so as to minimize the generalized completion time Σjgi(j)j(Cj). Here i(j) refers to the machine to which job j is dispatched, and Cj is the completion time of job j on that machine. It is assumed that jobs cannot migrate between machines and that each machine can work on a single job at any time instance. In particular, we are interested in finding an online scheduling policy whose objective cost is competitive with respect to a slower optimal offline benchmark, i.e., the one that knows all the job specifications a priori and is slower than the online algorithm. We first show that for the case of a single machine and special cost functions gj(t)=wjg(t), with nonnegative nondecreasing g(t), the highest-density-first rule is optimal for the generalized fractional completion time. We then extend this result by giving a speed-augmented competitive algorithm for the general nondecreasing cost functions gj(t) by utilizing a novel optimal control framework. This approach provides a principled method for identifying dual variables in different settings of online job scheduling with general cost functions. Using this method, we also provide a speed-augmented competitive algorithm for multiple unrelated machines with convex functions gij(t), where the competitive ratio depends on the curvature of cost functions gij(t).