We study the backbone and the backdoors of prepositional satisfiability problems. We make a number of theoretical, algorithmic and experimental contributions. From a theoretical perspective, we prove that backbones are hard even to approximate. From an algorithmic perspective, we present a number of different procedures for computing backdoors. From an empirical perspective, we study the correlation between being in the backbone and in a backdoor. Experiments show that there tends to be very little overlap between backbones and backdoors. We also study problem hardness for the Davis Putnam procedure. Problem hardness appears to be correlated with the size of strong backdoors, and weakly correlated with the size of the backbone, but does not...
Backdoor sets represent clever reasoning shortcuts through the search space for SAT and CSP. By inst...
Abstract. In a number of applications, it is not sufficient to decide whether a given propositional ...
We study parameterizations of the satisfiability problem for propositional formulas in conjunctive n...
We study the backbone and the backdoors of propositional satisfiability problems. We make a number o...
This thesis examines the question of how it is possible to improve search techniques by better under...
There has been considerable interest in the identification of structural properties of combinatorial...
Abstract. Although propositional satisfiability (SAT) is NP-complete, state-of-the-art SAT solvers a...
Abstract. Although propositional satisfiability (SAT) is NP-complete, state-of-the-art SAT solvers a...
Abstract. Backbones of propositional theories are literals that are true in every model. Backbones h...
The problem of propositional satisfiability (SAT) has found a number of applications in both theoret...
The surprisingly good performance of modern satisfiability (SAT) solvers is usually explained by the...
Abstract. There has been considerable interest in the identification of structural properties of com...
We introduce our work on the backdoor key, a concept that shows promise for characterizing problem h...
A strong backdoor in a formula ? of propositional logic to a tractable class C of formulas is a set ...
We introduce our work on the backdoor key, a concept that shows promise for characterizing problem ...
Backdoor sets represent clever reasoning shortcuts through the search space for SAT and CSP. By inst...
Abstract. In a number of applications, it is not sufficient to decide whether a given propositional ...
We study parameterizations of the satisfiability problem for propositional formulas in conjunctive n...
We study the backbone and the backdoors of propositional satisfiability problems. We make a number o...
This thesis examines the question of how it is possible to improve search techniques by better under...
There has been considerable interest in the identification of structural properties of combinatorial...
Abstract. Although propositional satisfiability (SAT) is NP-complete, state-of-the-art SAT solvers a...
Abstract. Although propositional satisfiability (SAT) is NP-complete, state-of-the-art SAT solvers a...
Abstract. Backbones of propositional theories are literals that are true in every model. Backbones h...
The problem of propositional satisfiability (SAT) has found a number of applications in both theoret...
The surprisingly good performance of modern satisfiability (SAT) solvers is usually explained by the...
Abstract. There has been considerable interest in the identification of structural properties of com...
We introduce our work on the backdoor key, a concept that shows promise for characterizing problem h...
A strong backdoor in a formula ? of propositional logic to a tractable class C of formulas is a set ...
We introduce our work on the backdoor key, a concept that shows promise for characterizing problem ...
Backdoor sets represent clever reasoning shortcuts through the search space for SAT and CSP. By inst...
Abstract. In a number of applications, it is not sufficient to decide whether a given propositional ...
We study parameterizations of the satisfiability problem for propositional formulas in conjunctive n...