Open AccessCoalgebraic Logic over Measurable Spaces: Behavioral and Logical Equivalence
Author(s) -
Christoph Schubert
Publication year - 2009
Publication title -
electronic notes in theoretical computer science
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.242
H-Index - 60
ISSN - 1571-0661
DOI - 10.1016/j.entcs.2009.11.027
Subject(s) - mathematics , functor , equivalence (formal languages) , pure mathematics , modal logic , equivalence relation , discrete mathematics , modal , algebra over a field , chemistry , polymer chemistry
We study the relationship between logical and behavioral equivalence for coalgebras on general measurable spaces. Modal logics are interpreted in these coalgebras using predicate liftings. Prominent examples include stochastic relations and labelled Markov transition systems and corresponding Hennessy–Milner type logics. Local versions of logical and behavioral equivalence are introduced and it is shown that these notions coincide for a wide class of functors. We relate these notions to the corresponding global ones common in model checking. Throughout, we work in general measurable spaces. In contrast to previous work, no topological assumptions on the state spaces are needed
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