PSPACE Reasoning for Graded Modal Logics
From International Center for Computational Logic
PSPACE Reasoning for Graded Modal Logics
Stephan TobiesStephan Tobies
Stephan Tobies
PSPACE Reasoning for Graded Modal Logics
Journal of Logic and Computation, 11(1):85-106, 2001
PSPACE Reasoning for Graded Modal Logics
Journal of Logic and Computation, 11(1):85-106, 2001
- KurzfassungAbstract
We present a PSPACE algorithm that decides satisfiability of the graded modal logic Gr(K_R) - a natural extension of propositional modal logic K_R by counting expressions - which plays an important role in the area of knowledge representation. The algorithm employs a tableaux approach and is the first known algorithm which meets the lower bound for the complexity of the problem. Thus, we exactly fix the complexity of the problem and refute a EXPTIME-hardness conjecture. We extend the results to the logic Gr(K_{R_cap^{-1
@article{T2001,
author = {Stephan Tobies},
title = {PSPACE Reasoning for Graded Modal Logics},
journal = {Journal of Logic and Computation},
volume = {11},
number = {1},
year = {2001},
pages = {85-106}
}
), which augments Gr(K_R) with inverse relations and intersection of accessibility relations. This establishes a kind of ``theoretical benchmark that all algorithmic approaches can be measured against.
|ISBN= |ISSN= |Link= |Download=Tobies-JLC-2001.ps.gz |Slides= |DOI Name= |Projekt= |Forschungsgruppe=Automatentheorie |BibTex=@article{ Tobies-JLC-2001,
author = {Stephan {Tobies} },
journal = {Journal of Logic and Computation},
number = {1},
pages = {85--106},
title = { {PSPACE} Reasoning for Graded Modal Logics},
volume = {11},
year = {2001},
} }}
