In the context of formal verification in general and model checking in particular, parity games serve as a mighty vehicle: many problems are encoded as parity games, which are then solved by the seminal algorithm by Jurdzinski. In this paper we identify the essence of this workflow to be the notion of progress measure, and formalize it in general, possibly infinitary, lattice-theoretic terms. Our view on progress measures is that they are to nested/alternating fixed points what invariants are to safety/greatest fixed points, and what ranking functions are to liveness/least fixed points. That is, progress measures are combination of the latter two notions (invariant and ranking function) that have been extensively studied in the context of (...
Calude et al. have recently shown that parity games can be solved in quasi-polynomial time, a landma...
AbstractWe describe a parallel algorithm for solving parity games, with applications in, e.g., modal...
AbstractThis paper generalizes existing connections between automata and logic to a coalgebraic abst...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Abstract. In this paper we develop a new algorithm for deciding the winner in parity games, and henc...
We initiate a study of automata-based model checking for previously proposed quantitative linear tim...
Coalgebra is a categorical modeling of state-based dynamics. Final coalgebras - as categorical great...
It is well understood that solving parity games is equivalent, up to polynomial time, to model check...
It is known that the model checking problem for the modal µ-calculus reduces to the problem of solvi...
Abstract. Universal Coalgebra provides the notion of a coalgebra as the natural mathematical general...
We present a generic partition refinement algorithm that quotients coalgebraic systems by behavioura...
Abstract: Formal methods and verification rely heavily on algorithms that compute which states of a ...
AbstractThis paper presents a reduction from the problem of solving parity games to the satisfiabili...
Solving parity games, which are equivalent to modal μ-calculus model checking, is a central algorith...
We establish principles for proving properties about infinite computations by reasoning about finit...
Calude et al. have recently shown that parity games can be solved in quasi-polynomial time, a landma...
AbstractWe describe a parallel algorithm for solving parity games, with applications in, e.g., modal...
AbstractThis paper generalizes existing connections between automata and logic to a coalgebraic abst...
Many analysis and verifications tasks, such as static program analyses and model-checking for tempor...
Abstract. In this paper we develop a new algorithm for deciding the winner in parity games, and henc...
We initiate a study of automata-based model checking for previously proposed quantitative linear tim...
Coalgebra is a categorical modeling of state-based dynamics. Final coalgebras - as categorical great...
It is well understood that solving parity games is equivalent, up to polynomial time, to model check...
It is known that the model checking problem for the modal µ-calculus reduces to the problem of solvi...
Abstract. Universal Coalgebra provides the notion of a coalgebra as the natural mathematical general...
We present a generic partition refinement algorithm that quotients coalgebraic systems by behavioura...
Abstract: Formal methods and verification rely heavily on algorithms that compute which states of a ...
AbstractThis paper presents a reduction from the problem of solving parity games to the satisfiabili...
Solving parity games, which are equivalent to modal μ-calculus model checking, is a central algorith...
We establish principles for proving properties about infinite computations by reasoning about finit...
Calude et al. have recently shown that parity games can be solved in quasi-polynomial time, a landma...
AbstractWe describe a parallel algorithm for solving parity games, with applications in, e.g., modal...
AbstractThis paper generalizes existing connections between automata and logic to a coalgebraic abst...