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FOCS
2007
IEEE
2007
IEEE
Parameterized Proof Complexity
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are not fixedparameter tractable. We consider proofs that witness that a given propositional formula cannot be satisfied by a truth assignment that sets at most k variables to true, considering k as the parameter (we call such a formula a parameterized contradiction). One could separate the parameterized complexity classes FPT and W[2] by showing that there is no proof system (for CNF formulas) that admits proofs of size f(k)nO(1) where f is a computable function and n represents the size of the propositional formula. By way of a first step, we introduce the system of parameterized tree-like resolution, and show that this system does not admit such proofs. We obtain this result as a corollary to a meta-theorem, the main result of this paper. The meta-theorem extends Riis’s Complexity Gap Theorem for tree-like resolution. Riis’s result establishes a dichotomy between polynomial and exp...
Real-time TrafficFOCS 2007 | Parameterized Tree-like Resolution | Theoretical Computer Science | Tree-like Resolution | Tree-like Resolution Proof |
| Added | 02 Jun 2010 |
| Updated | 02 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | FOCS |
| Authors | Stefan S. Dantchev, Barnaby Martin, Stefan Szeider |
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