An ordered approach to solving parity games in quasi-polynomial time and quasi-linear space

An ordered approach to solving parity games in quasi-polynomial time and quasi-linear space

Parity games play an important role in model checking and synthesis. In their paper, Calude et al. have recently shown that these games can be solved in quasi-polynomial time. We show that their algorithm can be implemented efficiently: we use their data structure as a progress measure, allowing for...

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Bibliographic Details
Published in:International journal on software tools for technology transfer Vol. 21; no. 3; pp. 325 - 349
Main Authors: Fearnley, John, Jain, Sanjay, de Keijzer, Bart, Schewe, Sven, Stephan, Frank, Wojtczak, Dominik
Format: Journal Article
Language:English
Published: Berlin/Heidelberg Springer Berlin Heidelberg 01-06-2019
Springer Nature B.V
Subjects:
Algorithms
Color matching
Complexity
Computer Science
Data structures
Games
Lower bounds
Parity
Polynomials
Production scheduling
Software Engineering
Software Engineering/Programming and Operating Systems
Spin 2017
Theory of Computation
Parity games
Quasi-polynomial
Progress measure
Online Access:Get full text
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Summary:Parity games play an important role in model checking and synthesis. In their paper, Calude et al. have recently shown that these games can be solved in quasi-polynomial time. We show that their algorithm can be implemented efficiently: we use their data structure as a progress measure, allowing for a backward implementation instead of a complete unravelling of the game. To achieve this, a number of changes have to be made to their techniques, where the main one is to add power to the antagonistic player that allows for determining her rational move without changing the outcome of the game. We provide a first implementation for a quasi-polynomial algorithm, test it on small examples, and provide a number of side results, including minor algorithmic improvements, a quasi-bi-linear complexity in the number of states and edges for a fixed number of colours, matching lower bounds for the algorithm of Calude et al., and a complexity index associated to our approach, which we compare to the recently proposed register index.
ISSN:1433-2779
1433-2787
DOI:10.1007/s10009-019-00509-3