The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the distance between occurrences of odd colors and the next occurrence of a larger even one. Such games quantitatively extend parity games while retaining most of their attractive properties, i.e, determining the winner is in NP and co-NP and one player has positional winning strategies. We show that the characteristics of parity games with costs are vastly different when asking for strategies realizing the minimal such bound: the solution problem becomes PSPACE-complete and exponential memory is both necessary in general and always sufficient. Thus, playing parity games with costs optimally is harder than just winning them. Moreover, we show that th...
Abstract. Parity games are 2-player games of perfect information and infinite duration that have imp...
Cost-parity games are a fundamental tool in system design for the analysis of reactive and distribut...
We study nondeterministic strategies in parity games with the aim of computing a most permissive win...
The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the dist...
The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the cost...
Quantitative extensions of parity games have recently attracted significant interest. These extensio...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
We consider two-player innite games played on graphs. The games are concurrent, in that at each stat...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
Classical objectives in two-player zero-sum games played on graphs often deal with limit behaviors o...
We demonstrate the usefulness of adding delay to infinite games with quantitative winning conditions...
Modeling reactive systems as infinite games has yielded a multitude of results in the fields of prog...
We consider 2-player games played on a finite state space for an infinite number of rounds. The game...
We study Markov decision processes and turn-based stochastic games with parity conditions. There are...
Abstract. Parity games are 2-player games of perfect information and infinite duration that have imp...
Cost-parity games are a fundamental tool in system design for the analysis of reactive and distribut...
We study nondeterministic strategies in parity games with the aim of computing a most permissive win...
The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the dist...
The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the cost...
Quantitative extensions of parity games have recently attracted significant interest. These extensio...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
We consider two-player innite games played on graphs. The games are concurrent, in that at each stat...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
We consider two-player games played on finite graphs equipped with costs on edges and introduce two ...
Classical objectives in two-player zero-sum games played on graphs often deal with limit behaviors o...
We demonstrate the usefulness of adding delay to infinite games with quantitative winning conditions...
Modeling reactive systems as infinite games has yielded a multitude of results in the fields of prog...
We consider 2-player games played on a finite state space for an infinite number of rounds. The game...
We study Markov decision processes and turn-based stochastic games with parity conditions. There are...
Abstract. Parity games are 2-player games of perfect information and infinite duration that have imp...
Cost-parity games are a fundamental tool in system design for the analysis of reactive and distribut...
We study nondeterministic strategies in parity games with the aim of computing a most permissive win...