Abstract
We introduce a family of temporal logics to specify the behavior of systems with Zeno behaviors. We extend linear-time temporal logic LTL to authorize models admitting Zeno sequences of actions and quantitative temporal operators indexed by ordinals replace the standard next-time and until future-time operators. Our aim is to control such systems by designing controllers that safely work on ω-sequences but interact synchronously with the system in order to restrict their behaviors. We show that the satisfiability problem for the logics working on ω k-sequences is expspace-complete when the integers are represented in binary, and pspace-complete with a unary representation. To do so, we substantially extend standard results about LTL by introducing a new class of succinct ordinal automata that can encode the interaction between the different quantitative temporal operators.
The first author acknowledges partial support by the ACI “Sécurité et Informatique” CORTOS. The second author acknowledges partial support by the e-Society project of MEXT. Part of this work was done while the second author was affiliated to LSV, CNRS & ENS de Cachan.
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Demri, S., Nowak, D. (2005). Reasoning About Transfinite Sequences. In: Peled, D.A., Tsay, YK. (eds) Automated Technology for Verification and Analysis. ATVA 2005. Lecture Notes in Computer Science, vol 3707. Springer, Berlin, Heidelberg. https://doi.org/10.1007/11562948_20
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DOI: https://doi.org/10.1007/11562948_20
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