English

Reasoning from hypotheses in *-continuous action lattices

Logic 2025-02-18 v3

Abstract

The class of all \ast-continuous Kleene algebras, whose description includes an infinitary condition on the iteration operator, plays an important role in computer science. The complexity of reasoning in such algebras - ranging from the equational theory to the Horn one, with restricted fragments of the latter in between - was analyzed by Kozen (2002). This paper deals with similar problems for \ast-continuous residuated Kleene lattices, also called \ast-continuous action lattices, where the product operation is augmented by residuals. We prove that, in the presence of residuals, the fragment of the corresponding Horn theory with \ast-free hypotheses has the same complexity as the ωω\omega^\omega iteration of the halting problem, and hence is properly hyperarithmetical. We also prove that if only commutativity conditions are allowed as hypotheses, then the complexity drops down to Π10\Pi^0_1 (i.e. the complement of the halting problem), which is the same as that for \ast-continuous Kleene algebras. In fact, we get stronger upper bound results: the fragments under consideration are translated into suitable fragments of infinitary action logic with exponentiation, and our upper bounds are obtained for the latter ones.

Keywords

Cite

@article{arxiv.2408.02118,
  title  = {Reasoning from hypotheses in *-continuous action lattices},
  author = {Stepan L. Kuznetsov and Tikhon Pshenitsyn and Stanislav O. Speranski},
  journal= {arXiv preprint arXiv:2408.02118},
  year   = {2025}
}

Comments

Accepted to the Journal of Symbolic Logic

R2 v1 2026-06-28T18:03:39.665Z