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Nondeterministic Propositional Dynamic Logic with intersection is decidable

  • Ryszard Danecki
Conference paper
Part of the Lecture Notes in Computer Science book series (LNCS, volume 208)

Keywords

Tree Automaton Special Graph Validation Tree Propositional Dynamic Logic Syntactical Tree 
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References

  1. [D]
    R. Danecki, Propositional Dynamic Logic with strong loop predicate, Proc. MFCS'84, LNCS 176, 573–581 (1984) Springer-VerlagGoogle Scholar
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    M. J. Fisher, R. E. Ladner, Propositional Dynamic Logic of regular programs, JCSS 18:2, (1979), 194–211Google Scholar
  3. [H]
    D. Harel, Recurring dominoes: Making the highly undecidable highly understandable, Proc. FCT'83, LNCS 158, 177–194, (1983) Springer-VerlagGoogle Scholar
  4. [R69]
    M. O. Rabin, Decidability of second-order theories and automata on infinite trees, Trans. AMS 141 (1969), 1–35Google Scholar
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    M. O. Rabin, Weakly definable relations and special automata, in: Math. Logic and Found. of Set Theory (Y. Bar-Hillel ed.) North-Holland (1970), 1–23Google Scholar
  6. [S]
    R. S. Streett, Propositional Dynamic Logic of looping and converse is elementarily decidable, Inform. & Control 54, 121–141 (1982)Google Scholar

Copyright information

© Springer-Verlag Berlin Heidelberg 1985

Authors and Affiliations

  • Ryszard Danecki
    • 1
  1. 1.Institute of MathematicsPolish Acad. of Sci.PoznańPoland

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