Proof Systems for Tensor-based Model Counting

Authors

  • Olaf Beyersdorff Friedrich Schiller University Jena
  • Joachim Giesen Friedrich Schiller University Jena
  • Andreas Goral Friedrich Schiller University Jena
  • Tim Hoffmann Friedrich Schiller University Jena
  • Kaspar Kasche Friedrich Schiller University Jena
  • Christoph Staudt Friedrich Schiller University Jena

DOI:

https://doi.org/10.1609/aaai.v40i17.38430

Abstract

Solving the model counting problem #SAT, asking for the number of satisfying assignments of a propositional formula, has been explored intensively and has gathered its own community. While most existing solvers are based on knowledge compilation, another promising approach is through contraction in tensor hypernetworks. We perform a theoretical proof-complexity analysis of this approach. For this, we design two new tensor-based proof systems that we show to tightly correspond to tensor-based #SAT solving. We determine the simulation order of #SAT proof systems and prove exponential separations between the systems. This sheds light on the relative performance of different #SAT solving approaches.
AAAI-26 / IAAI-26 / EAAI-26 Proceedings Cover

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Published

2026-03-14

How to Cite

Beyersdorff, O., Giesen, J., Goral, A., Hoffmann, T., Kasche, K., & Staudt, C. (2026). Proof Systems for Tensor-based Model Counting. Proceedings of the AAAI Conference on Artificial Intelligence, 40(17), 14175–14183. https://doi.org/10.1609/aaai.v40i17.38430

Issue

Vol. 40 No. 17: AAAI-26 Technical Tracks 17

Section

AAAI Technical Track on Constraint Satisfaction and Optimization