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ICALP
2010
Springer
2010
Springer
Mean-Payoff Games and Propositional Proofs
We associate a CNF-formula to every instance of the mean-payoff game problem in such a way that if the value of the game is non-negative the formula is satisfiable, and if the value of the game is negative the formula has a polynomial-size refutation in Σ2-Frege (i.e. DNF-resolution). This reduces mean-payoff games to the weak automatizability of Σ2-Frege, and to the interpolation problem for Σ2,2-Frege. Since the interpolation problem for Σ1-Frege (i.e. resolution) is solvable in polynomial time, our result is close to optimal up to the computational complexity of solving mean-payoff games. The proof of the main result requires building low-depth formulas that compute the bits of the sum of a constant number of integers in binary notation, and low-complexity proofs of the required arithmetic properties.
Real-time TrafficICALP 2010 | Interpolation Problem | Mean-payoff Game Problem | Mean-payoff Games | Programming Languages |
Related Content
| Added | 19 Jul 2010 |
| Updated | 19 Jul 2010 |
| Type | Conference |
| Year | 2010 |
| Where | ICALP |
| Authors | Albert Atserias, Elitza N. Maneva |
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