Finding Optimal Cost-Bounded Plan Reductions
DOI:
https://doi.org/10.1609/icaps.v36i1.42849Abstract
In some real applications a plan may later become unfeasible due to newly imposed budget constraints, yet, at the same time, using only the original actions of the plan and their order is mandatory. In this paper, we study the problem of extracting, from a precomputed plan, a valid subplan that maximizes utility while respecting a cost bound. Each goal is given a utility value and the plan is reduced by removing actions that support low-utility goals, while preserving both executability and the original action order. We show the decision variant is NP-complete and propose two exact methods to solve it: one via oversubscription planning (OSP) and another via Integer Linear Programming (ILP). Experiments show that ILP outperforms OSP, providing a practical solution in domains where maintaining the structure of the original plan is essential.
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Published
2026-06-08
How to Cite
Del Toro, M., Fuentetaja, R., & García-Olaya, Ángel. (2026). Finding Optimal Cost-Bounded Plan Reductions. Proceedings of the International Conference on Automated Planning and Scheduling, 36(1), 377–381. https://doi.org/10.1609/icaps.v36i1.42849
