I have a job scheduling problem with a twist- a minimization constraint. The task is- I have many jobs, each with various dependencies on other jobs, without cycles. These jobs have categories as well, and can be ran together in parallel for free if they belong to the same category. So, I want to order the jobs so that each job comes after its dependencies, but arranged in such a way that they are grouped by category (to run many in parallel) to minimize the number of serial jobs I run. That is, adjacent jobs of the same category count as a single serial job.

I know I can sort topologically to handle dependency ordering. I’ve tried using graph coloring on the subgraphs containing each category of jobs, but I run into problems with inter-category dependency conflicts. More specifically, when I have to make a decision of which of two or more pairs of jobs to group. I can brute force this, and I can try random walks over the search space, but I’m hoping for something smarter. The former blows up exponentially in the worst case, the latter is not guaranteed to be optimal.

To put things into scale- there can be as many as a couple hundred thousand jobs to schedule at once, with maybe a couple hundred categories of jobs.

I’ve stumbled upon many optimizations such as creating a graph of dependencies, splitting into connected components, and solving each subproblem independently and merging. I also realize there’s a lower bound by either the number of colors to color each category, but not sure how to use that beyond an early exit condition.

Is there a better way to find an ordering or jobs to maximize this “grouping” of jobs of a category, in order to minimize the total number of serial jobs?