We consider two-player games played over finite state spaces for an infinite number of rounds. At each state, the players simultaneously choose moves; the moves determine a successor state. It is often advantageous for players to choose probability distributions over moves, rather than single moves. Given a goal (e.g., “reach a target state”), the question of winning is thus a probabilistic one: “what is the maximal probability of winning from a given state?”. On these game structures, two fundamental notions are those of equivalences and metrics. Given a set of winning conditions, two states are equivalent if the players can win the same games with the same probability from both states. Metrics provide a bound on the difference in the prob...
International audienceThe probabilistic (or quantitative) modal mu-calculus is a fixed-point logic d...
This paper denes action-labelled quantitative transition systems as a general frame-work for combini...
The quantitative μ-calculus qMμ extends the applicability of Kozen’s standard μ-calculus [5] to prob...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
Simulation and bisimulation metrics for stochastic systems provide a quantitative generaliza-tion of...
Bisimilarity as an equivalence notion of systems has been central to process theory. Due to the rece...
AbstractWe consider two-player games played for an infinite number of rounds, with ω-regular winning...
International audienceThis paper investigates the equivalence between games represented by state tra...
This paper investigates the equivalence between games represented by state transition models and its...
This paper defines action-labelled quantitative transition systems as a general framework for combin...
International audienceWe develop a general framework for reasoning about distances between transitio...
Abstract. Classical formalizations of systems and properties are bool-ean: given a system and a prop...
International audienceThe probabilistic (or quantitative) modal mu-calculus is a fixed-point logic d...
This paper denes action-labelled quantitative transition systems as a general frame-work for combini...
The quantitative μ-calculus qMμ extends the applicability of Kozen’s standard μ-calculus [5] to prob...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
We consider two-player games played over finite state spaces for an infinite number of rounds. At ea...
Simulation and bisimulation metrics for stochastic systems provide a quantitative generaliza-tion of...
Bisimilarity as an equivalence notion of systems has been central to process theory. Due to the rece...
AbstractWe consider two-player games played for an infinite number of rounds, with ω-regular winning...
International audienceThis paper investigates the equivalence between games represented by state tra...
This paper investigates the equivalence between games represented by state transition models and its...
This paper defines action-labelled quantitative transition systems as a general framework for combin...
International audienceWe develop a general framework for reasoning about distances between transitio...
Abstract. Classical formalizations of systems and properties are bool-ean: given a system and a prop...
International audienceThe probabilistic (or quantitative) modal mu-calculus is a fixed-point logic d...
This paper denes action-labelled quantitative transition systems as a general frame-work for combini...
The quantitative μ-calculus qMμ extends the applicability of Kozen’s standard μ-calculus [5] to prob...