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

Abstract

The paper “An Optimal Control Framework for Online Job Scheduling with General Cost Functions,” by Etesami devises online speed-augmented competitive algorithms for minimizing the generalized completion time on a single and multiple unrelated machines for a very general class of cost functions. To that end, a novel optimal control formulation for the offline version of the problem is developed. Such a formulation allows using tools from optimal control theory, such as the minimum principle and Hamilton-Jacobi-Bellman equation, to set the dual variables as close as possible to the optimal dual variables and leverage them to design primal-dual online algorithms as an iterative application of the offline problem. The analysis can achieve state-of-the-art competitive ratios for several special cases and provide new competitive ratios which are the first in their settings. In particular, the analysis offers a principled method of estimating dual variables in a general setting of online job scheduling.