Learning More Expressive General Policies for Classical Planning Domains
DOI:
https://doi.org/10.1609/aaai.v39i25.34872Abstract
GNN-based approaches for learning general policies across planning domains are limited by the expressive power of C2, namely; first-order logic with two variables and counting. This limitation can be overcomed by transitioning to k-GNNs, for k=3, wherein object embeddings are substituted with triplet embeddings. Yet, while 3-GNNs have the expressive power of C3, unlike 1- and 2-GNNs that are confined to C2, they require quartic time for message exchange and cubic space to store embeddings, rendering them infeasible. In this work, we introduce a parameterized version R-GNN[t] (with parameter t) of Relational GNNs. Unlike GNNs, that are designed to perform computation on graphs, Relational GNNs are designed to do computation on relational structures. When t=infty, R-GNN[t] approximates 3-GNNs over graphs, but using only quadratic space for embeddings. For lower values of t, such as t=1 and t=2, R-GNN[t] achieves a weaker approximation by exchanging fewer messages, yet interestingly, often yield the expressivity required in several planning domains. Furthermore, the new R-GNN[t] architecture is the original R-GNN architecture with a suitable transformation applied to the inputs only. Experimental results illustrate the clear performance gains of R-GNN[1] over the plain R-GNNs, and also over Edge Transformers that also approximate 3-GNNs.
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Published
2025-04-11
How to Cite
Ståhlberg, S., Bonet, B., & Geffner, H. (2025). Learning More Expressive General Policies for Classical Planning Domains. Proceedings of the AAAI Conference on Artificial Intelligence, 39(25), 26697–26706. https://doi.org/10.1609/aaai.v39i25.34872
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Section
AAAI Technical Track on Planning, Routing, and Scheduling
