Homomorphisms and Embeddings of STRIPS Planning Models
This work addresses foundational complexity issues in automated planning, with incremental contributions to algorithm design and preprocessing techniques.
The paper tackles the problem of determining isomorphisms and embeddings between STRIPS planning instances, showing that isomorphism is GI-complete and other problems are NP-complete, and demonstrates experimentally that constraint propagation preprocessing significantly improves SAT solver efficiency.
Determining whether two STRIPS planning instances are isomorphic is the simplest form of comparison between planning instances. It is also a particular case of the problem concerned with finding an isomorphism between a planning instance $P$ and a sub-instance of another instance $P_0$ . One application of such a mapping is to efficiently produce a compiled form containing all solutions to P from a compiled form containing all solutions to $P_0$. We also introduce the notion of embedding from an instance $P$ to another instance $P_0$, which allows us to deduce that $P_0$ has no solution-plan if $P$ is unsolvable. In this paper, we study the complexity of these problems. We show that the first is GI-complete, and can thus be solved, in theory, in quasi-polynomial time. While we prove the remaining problems to be NP-complete, we propose an algorithm to build an isomorphism, when possible. We report extensive experimental trials on benchmark problems which demonstrate conclusively that applying constraint propagation in preprocessing can greatly improve the efficiency of a SAT solver.