International audienceWe transfer a notion of quantitative bisimilarity for labelled Markov processes to Markov decision processes with continuous state spaces. This notion takes the form of a pseudometric on the system states, cast in terms of the equivalence of a family of functional expressions evaluated on those states and interpreted as a real-valued modal logic. Our proof amounts to a slight modification of previous techniques used to prove equivalence with a fixed-point pseudometric on the state-space of a labelled Markov process and making heavy use of the Kantorovich probability metric. Indeed, we again demonstrate equivalence with a fixed-point pseudometric defined on Markov decision processes; what is novel is that we recast this...
We introduce a notion of bisimulation on labelled Markov Processes over generic measurable spaces in...
International audienceBisimulation is a notion of behavioural equivalence on the statesof a transiti...
A central questions in the field of probabilistic and Markovian systems is “when do two systems beha...
International audienceWe transfer a notion of quantitative bisimilarity for labelled Markov processe...
AbstractIn this paper we introduce a new class of labelled transition systems—labelled Markov proces...
AbstractWe quickly review labelled Markov processes (LMP) and provide a counterexample showing that ...
Probabilistic bisimulation is a widely studied equivalence relation for stochastic systems. However,...
In this paper we introduce a new class of labelled tran-sition systems- Labelled Markov Processes- a...
© 2017 Elsevier Inc. Larsen and Skou initiated the study of probabilistic bisimilarity and its chara...
In this paper we introduce a new class of labelled transition systems - Labelled Markov Processes - ...
We recast the theory of labelled Markov processes in a new setting, in a way "dual" to the usual ...
Labelled Markov processes are probabilistic versions of labelled transition systems. In general, the...
In this paper we introduce a new class of labeled transition systems - Labeled Markov Processes - an...
We develop a theory of probabilistic continuous processes that is meant ultimately to be part of an ...
Bisimulation is a notion of behavioural equiva-lence on the states of a transition system. Its defi-...
We introduce a notion of bisimulation on labelled Markov Processes over generic measurable spaces in...
International audienceBisimulation is a notion of behavioural equivalence on the statesof a transiti...
A central questions in the field of probabilistic and Markovian systems is “when do two systems beha...
International audienceWe transfer a notion of quantitative bisimilarity for labelled Markov processe...
AbstractIn this paper we introduce a new class of labelled transition systems—labelled Markov proces...
AbstractWe quickly review labelled Markov processes (LMP) and provide a counterexample showing that ...
Probabilistic bisimulation is a widely studied equivalence relation for stochastic systems. However,...
In this paper we introduce a new class of labelled tran-sition systems- Labelled Markov Processes- a...
© 2017 Elsevier Inc. Larsen and Skou initiated the study of probabilistic bisimilarity and its chara...
In this paper we introduce a new class of labelled transition systems - Labelled Markov Processes - ...
We recast the theory of labelled Markov processes in a new setting, in a way "dual" to the usual ...
Labelled Markov processes are probabilistic versions of labelled transition systems. In general, the...
In this paper we introduce a new class of labeled transition systems - Labeled Markov Processes - an...
We develop a theory of probabilistic continuous processes that is meant ultimately to be part of an ...
Bisimulation is a notion of behavioural equiva-lence on the states of a transition system. Its defi-...
We introduce a notion of bisimulation on labelled Markov Processes over generic measurable spaces in...
International audienceBisimulation is a notion of behavioural equivalence on the statesof a transiti...
A central questions in the field of probabilistic and Markovian systems is “when do two systems beha...