Relational presheaves, change of base and weak simulation
نویسنده
چکیده
We show that considering labelled transition systems as relational presheaves captures several recently studied examples in a general setting. This approach takes into account possible algebraic structure on labels. We show that left (2-)adjoints to change-of-base functors between categories of relational presheaves with relational morphisms always exist and, as an application, that weak closure (in the sense of Milner) of a labelled transition system can be understood as a left adjoint to a change-of-base functor.
منابع مشابه
Relational Presheaves as Labelled Transition Systems
We show that viewing labelled transition systems as relational presheaves captures several recently studied examples. This approach takes into account possible algebraic structure on labels. Weak closure of a labelled transition system is characterised as a left (2-)adjoint to a change-of-base functor. A famous application of coalgebra theory [3] is as a pleasingly abstract setting for the theo...
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We show that viewing labelled transition systems as relational presheaves captures several recently studied examples. This approach takes into account possible algebraic structure on labels. Weak closure of a labelled transition system is characterised as a left (2-)adjoint to a change-of-base functor. A famous application of coalgebra [3, 4] is as a pleasingly abstract setting for the theory o...
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عنوان ژورنال:
- J. Comput. Syst. Sci.
دوره 81 شماره
صفحات -
تاریخ انتشار 2015