论文信息 - An Improved Pseudo-Polynomial Upper Bound for the Value Problem and Optimal Strategy Synthesis in Mean Payoff Games

An Improved Pseudo-Polynomial Upper Bound for the Value Problem and Optimal Strategy Synthesis in Mean Payoff Games

In this work we offer an $O(|V|^2 |E|\, W)$ pseudo-polynomial time deterministic algorithm for solving the Value Problem and Optimal Strategy Synthesis in Mean Payoff Games. This improves by a factor $\log(|V|\, W)$ the best previously known pseudo-polynomial time upper bound due to Brim,~\etal The improvement hinges on a suitable characterization of values, and a description of optimal positional strategies, in terms of reweighted Energy Games and Small Energy-Progress Measures.

Romeo Rizzi | Carlo Comin | Carlo Comin | Romeo Rizzi

[1] A. Ehrenfeucht,et al. Positional strategies for mean payoff games , 1979 .

[2] A. Karzanov,et al. Cyclic games and an algorithm to find minimax cycle means in directed graphs , 1990 .

[3] Kim G. Larsen,et al. Infinite Runs in Weighted Timed Automata with Energy Constraints , 2008, FORMATS.

[4] PatersonMike,et al. The complexity of mean payoff games on graphs , 1996 .

[5] Uri Zwick,et al. The Complexity of Mean Payoff Games on Graphs , 1996, Theor. Comput. Sci..

[6] L. Brim,et al. Faster algorithms for mean-payoff games , 2011, Formal Methods Syst. Des..

[7] Marcin Jurdziński,et al. Deciding the Winner in Parity Games is in UP \cap co-Up , 1998, Inf. Process. Lett..

[8] S. Vorobyov,et al. Fast Algorithms for Monotonic Discounted Linear Programs with Two Variables per Inequality , 2006 .

[9] Y. Lifshits,et al. Potential theory for mean payoff games , 2007 .

[10] Ronald L. Graham,et al. Concrete mathematics - a foundation for computer science , 1991 .

[11] Thomas A. Henzinger,et al. Resource Interfaces , 2003, EMSOFT.

[12] Ronald L. Graham,et al. Concrete mathematics - a foundation for computer science (2. ed.) , 1994 .

[13] Jakub Pawlewicz,et al. Order Statistics in the Farey Sequences in Sublinear Time and Counting Primitive Lattice Points in Polygons , 2008, Algorithmica.