PSPACE bounds for rank-1 modal logics
Loading...
Date
Authors
Schroder, Lutz
Pattinson, Dirk
Journal Title
Journal ISSN
Volume Title
Publisher
Association for Computing Machinery Inc (ACM)
Abstract
For lack of general algorithmic methods that apply to wide classes of logics, establishing a complexity bound for a given modal logic is often a laborious task. The present work is a step towards a general theory of the complexity of modal logics. Our main result is that all rank-1 logics enjoy a shallow model property and thus are, under mild assumptions on the format of their axiomatisation, in PSPACE. This leads to a unified derivation of tight PSPACE-bounds for a number of logics, including K, KD, coalition logic, graded modal logic, majority logic, and probabilistic modal logic. Our generic algorithm moreover finds tableau proofs that witness pleasant proof-theoretic properties including a weak subformula property. This generality is made possible by a coalgebraic semantics, which conveniently abstracts from the details of a given model class and thus allows covering a broad range of logics in a uniform way.
Description
Keywords
Citation
Collections
Source
ACM Transactions on Computational Logic
Type
Book Title
Entity type
Access Statement
License Rights
Restricted until
2037-12-31