Add to ORKGSmall Progress Measures is one of the most efficient parity game solving algorithms. The original algorithm provides the full solution (winning regions and strategies) in $O(dm \cdot (n/ \lceil d/2 \rceil)^{\lceil d/2 \rceil} )$ time, and requires a re-run of the algorithm on one of the winning regions. We provide a novel operational interpretation of progress measures, and modify the algorithm so that it derives the winning strategies for both players in one pass. This reduces the upper bound on strategy derivation for SPM to $O(dm \cdot (n/ \lceil d/2 \rceil)^{\lceil d/2 \rceil} )$
We propose a pattern for designing algorithms that run in polynomial time by construction and undera...
We propose a novel algorithm for the solution of mean-payoff games that merges together two seemingl...
AbstractWe propose a pattern for designing algorithms that run in polynomial time by construction an...
Small Progress Measures is one of the most efficient parity game solving algorithms. The original al...
Small Progress Measures is one of the classical parity game solving algorithms. For games with n ver...
Abstract. In this paper we develop a new algorithm for deciding the winner in parity games, and henc...
A discrete strategy improvement algorithm is given for constructingwinning strategies in parity game...
The recent breakthrough paper by Calude et al. has given the first algorithm for solving parity game...
The McNaughton-Zielonka divide et impera algorithm is the simplest and most flexible approach availa...
Calude et al. have recently shown that parity games can be solved in quasi-polynomial time, a landma...
A software artifact to reproduce the experimental results in the paper: Improving Parity Games with ...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
Parity games are infinite-round two-player games played on directed graphs whose nodes are labeled w...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
This article proposes a new algorithm that improves the complexity bound for solving parity games. O...
We propose a pattern for designing algorithms that run in polynomial time by construction and undera...
We propose a novel algorithm for the solution of mean-payoff games that merges together two seemingl...
AbstractWe propose a pattern for designing algorithms that run in polynomial time by construction an...
Small Progress Measures is one of the most efficient parity game solving algorithms. The original al...
Small Progress Measures is one of the classical parity game solving algorithms. For games with n ver...
Abstract. In this paper we develop a new algorithm for deciding the winner in parity games, and henc...
A discrete strategy improvement algorithm is given for constructingwinning strategies in parity game...
The recent breakthrough paper by Calude et al. has given the first algorithm for solving parity game...
The McNaughton-Zielonka divide et impera algorithm is the simplest and most flexible approach availa...
Calude et al. have recently shown that parity games can be solved in quasi-polynomial time, a landma...
A software artifact to reproduce the experimental results in the paper: Improving Parity Games with ...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
Parity games are infinite-round two-player games played on directed graphs whose nodes are labeled w...
In a mean-payoff parity game, one of the two players aims both to achieve a qualitative parity objec...
This article proposes a new algorithm that improves the complexity bound for solving parity games. O...
We propose a pattern for designing algorithms that run in polynomial time by construction and undera...
We propose a novel algorithm for the solution of mean-payoff games that merges together two seemingl...
AbstractWe propose a pattern for designing algorithms that run in polynomial time by construction an...