English

Making Metric Temporal Logic Rational

Logic in Computer Science 2017-05-04 v1

Abstract

We study an extension of \mtl\mtl in pointwise time with rational expression guarded modality \regI(\re)\reg_I(\re) where \re\re is a rational expression over subformulae. We study the decidability and expressiveness of this extension (\mtl\mtl+φ\uregI,\reφ\varphi \ureg_{I, \re} \varphi+\regI,\reφ\reg_{I,\re}\varphi), called \regmtl\regmtl, as well as its fragment \sfmtl\sfmtl where only star-free rational expressions are allowed. Using the technique of temporal projections, we show that \regmtl\regmtl has decidable satisfiability by giving an equisatisfiable reduction to \mtl\mtl. We also identify a subclass \mitl+\ureg\mitl+\ureg of \regmtl\regmtl for which our equi-satisfiable reduction gives rise to formulae of \mitl\mitl, yielding elementary decidability. As our second main result, we show a tight automaton-logic connection between \sfmtl\sfmtl and partially ordered (or very weak) 1-clock alternating timed automata.

Keywords

Cite

@article{arxiv.1705.01501,
  title  = {Making Metric Temporal Logic Rational},
  author = {Shankara Narayanan Krishna and Khushraj Madnani and P. K. Pandya},
  journal= {arXiv preprint arXiv:1705.01501},
  year   = {2017}
}
R2 v1 2026-06-22T19:35:52.629Z