Higher-Order Pattern Unification Modulo Similarity Relations
Abstract
The combination of higher-order theories and fuzzy logic can be useful in decision-making tasks that involve reasoning across abstract functions and predicates, where exact matches are often rare or unnecessary. Developing efficient reasoning and computational techniques for such a combined formalism presents a significant challenge. In this paper, we adopt a more straightforward approach aiming at integrating two well-established and computationally well-behaved components: higher-order patterns on one side and fuzzy equivalences expressed through similarity relations based on minimum T-norm on the other. We propose a unification algorithm for higher-order patterns modulo these similarity relations and prove its termination, soundness, and completeness. This unification problem, like its crisp counterpart, is unitary. The algorithm computes a most general unifier with the highest degree of approximation when the given terms are unifiable.
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Cite
@article{arxiv.2507.13208,
title = {Higher-Order Pattern Unification Modulo Similarity Relations},
author = {Besik Dundua and Temur Kutsia},
journal= {arXiv preprint arXiv:2507.13208},
year = {2025}
}
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23 pages