Presents codensity bisimilarity games as a general categorical characterization of bisimilarity-like notions via fibrations, coalgebras, and predicate transformers, covering bisimulation metrics and new notions such as bisimulation topology.
Path category for free - Open morphisms from coalgebras with non-deterministic branching
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
There are different categorical approaches to variations of transition systems and their bisimulations. One is coalgebra for a functor G, where a bisimulation is defined as a span of G-coalgebra homomorphism. Another one is in terms of path categories and open morphisms, where a bisimulation is defined as a span of open morphisms. This similarity is no coincidence: given a functor G, fulfilling certain conditions, we derive a path-category for pointed G-coalgebras and lax homomorphisms, such that the open morphisms turn out to be precisely the G-coalgebra homomorphisms. The above construction provides path-categories and trace semantics for free for different flavours of transition systems: (1) non-deterministic tree automata (2) regular nondeterministic nominal automata (RNNA), an expressive automata notion living in nominal sets (3) multisorted transition systems. This last instance relates to Lasota's construction, which is in the converse direction.
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cs.LO 1years
2019 1verdicts
UNVERDICTED 1representative citing papers
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Codensity Games for Bisimilarity
Presents codensity bisimilarity games as a general categorical characterization of bisimilarity-like notions via fibrations, coalgebras, and predicate transformers, covering bisimulation metrics and new notions such as bisimulation topology.