Continuity as a computational effect

Neves, Renato; Barbosa, Lu­ís Soares; Hofmann, Dirk; Martins, Manuel A.

doi:10.1016/j.jlamp.2016.05.005

Cited by 10 publications

(17 citation statements)

References 35 publications

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“…Finally, a coalgebraic characterisation of hybrid automata makes possible to see them as hybrid components (cf. [NBHM16]), in the spirit of [Bar03,HJ11]. Generally speaking, this sort of component reproduces the black-box perspective here adopted; and the associated calculus brings to hybrid automata several forms of composition operators (e.g., parallel, pipelining, sum), refinement techniques, and wiring mechanisms, as well as the corresponding algebraic laws.…”

Section: Discussionmentioning

confidence: 96%

Hybrid Automata as Coalgebras

Neves

Barbosa

2016

Theoretical Aspects of Computing – ICTAC 2016

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Able to simultaneously encode discrete transitions and continuous behaviour, hybrid automata are the de facto framework for the formal specification and analysis of hybrid systems. The current paper revisits hybrid automata from a coalgebraic point of view. This allows to interpret them as state-based components, and provides a uniform theory to address variability in their definition, as well as the corresponding notions of behaviour, bisimulation, and observational semantics.

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Section: Discussionmentioning

confidence: 96%

Hybrid Automata as Coalgebras

Neves

Barbosa

2016

Theoretical Aspects of Computing – ICTAC 2016

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“…With the natural transformation above, it becomes straightforwad to consider the non-deterministic bouncing ball in a topological setting. Actually, it can be shown to be a coalgebra nxt, out : S → VS × HO First, the map out : S → HO was already shown to be continuous in [NBHM16]. Then, observe that the map nxt : S → VS can be rewritten as a composite…”

Section: Vietoris Coalgebras At Workmentioning

confidence: 98%

“…Due to the gravitional effect (g), it falls into the ground and then bounces back up, losing, for example, half of its kinetic energy. As the documents [NBHM16,NB16] show, such a behaviour can be described coalgebraically, with the help of the functor defined below.…”

Section: Vietoris Coalgebras At Workmentioning

confidence: 99%

Limits in categories of Vietoris coalgebras

Hofmann¹,

Neves²,

Nora³

2018

Math. Struct. Comp. Sci.

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Motivated by the need to reason about hybrid systems, we study limits in categories of coalgebras whose underlying functor is a Vietoris polynomial one -intuitively, the topological analogue of a Kripke polynomial functor. Among other results, we prove that every Vietoris polynomial functor admits a final coalgebra if it respects certain conditions concerning separation axioms and compactness.When the functor is restricted to some of the categories induced by these conditions the resulting categories of coalgebras are even complete.As a practical application, we use these developments in the specification and analysis of nondeterministic hybrid systems, in particular to obtain suitable notions of stability, and behaviour.

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“…This helps in some situations but is far from providing a general answer, calling for further research possibly in connection to recent advances in categorial quantum physics and monoidal categories [9]. A fully fledged, coalgebraic trace semantics for probabilistic, component oriented software systems will call for subdistributions and, more generally, measure theory [23,39] in particular if applied to hybrid systems [35].…”

Section: Future Workmentioning

confidence: 99%