Monadic Second-Order Logic of Permutations
Abstract
Permutations can be viewed as pairs of linear orders, or more formally as models over a signature consisting of two binary relation symbols. This approach was adopted by Albert, Bouvel and F\'eray, who studied the expressibility of first-order logic in this setting. We focus our attention on monadic second-order logic. Our results go in two directions. First, we investigate the expressive power of monadic second-order logic. We exhibit natural properties of permutations that can be expressed in monadic second-order logic but not in first-order logic. Additionally, we show that the property of having a fixed point is inexpressible even in monadic second-order logic. Secondly, we focus on the complexity of monadic second-order model checking. We show that there is an algorithm deciding if a permutation satisfies a given monadic second-order sentence in time for some computable function where and is the tree-width of . On the other hand, we prove that the problem remains hard even when we restrict the permutation to a fixed hereditary class with mild assumptions on .
Keywords
Cite
@article{arxiv.2511.02386,
title = {Monadic Second-Order Logic of Permutations},
author = {Vít Jelínek and Michal Opler},
journal= {arXiv preprint arXiv:2511.02386},
year = {2025}
}