Open AccessPDL with Intersection and Converse Is Decidable
Author(s) -
Carsten Lutz
Publication year - 2005
Publication title -
lecture notes in computer science
Language(s) - English
Resource type - Book series
SCImago Journal Rank - 0.249
H-Index - 400
eISSN - 1611-3349
pISSN - 0302-9743
ISBN - 3-540-28231-9
DOI - 10.1007/11538363_29
Subject(s) - decidability , converse , computer science , dynamic logic (digital electronics) , intersection (aeronautics) , extension (predicate logic) , theoretical computer science , intermediate logic , description logic , algorithm , mathematics , programming language , physics , transistor , voltage , quantum mechanics , engineering , aerospace engineering , geometry
In its many guises and variations, propositional dynamic logic (PDL) plays an important role in various areas of computer science such as databases, artificial intelligence, and computer linguistics. One relevant and powerful variation is ICPDL, the extension of PDL with intersection and converse. Although ICPDL has several interesting applications, its computational properties have never been investigated. In this paper, we prove that ICPDL is decidable by developing a translation to the monadic second order logic of infinite trees. Our result has applications in information logic, description logic, and epistemic logic. In particular, we solve a long-standing open problem in information logic. Another virtue of our approach is that it provides a decidability proof that is more transparent than existing ones for PDL with intersection (but without converse).
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