We provide the first proof complexity results for QBF dependency calculi. By showing that the reflexive resolution path dependency scheme admits exponentially shorter Q-resolution proofs on a known family of instances, we answer a question first posed by Slivovsky and Szeider in 2014 [30]. Further, we conceive a method of QBF solving in which dependency recomputation is utilised as a form of inprocessing. Formalising this notion, we introduce a new calculus in which a dependency scheme is applied dynamically. We demonstrate the further potential of this approach beyond that of the existing static system with an exponential separation
We propose the first general technique for proving genuine lower bounds in expansion-based QBF proof...
Dependency quantified Boolean formulas (DQBFs) are a powerful formalism, which subsumes quantified B...
Several calculi for quantified Boolean formulas (QBFs) exist, but relations between them are not yet...
We provide the first proof complexity results for QBF dependency calculi. By showing that the reflex...
Quantified Boolean Formulas (QBF) and their proof complexity are not as well understood as proposit...
In sharp contrast to classical proof complexity we are currently short of lower bound techniques for...
In sharp contrast to classical proof complexity we are currently short oflower bound techniques for ...
Dependency quantified Boolean formulas (DQBF) and QBF dependency schemes have been treated separatel...
We investigate two QBF resolution systems that use extension variables: weak extended Q-resolution, ...
Proof systems for quantified Boolean formulas (QBFs) provide a theoretical underpinning for the perf...
We pioneer a new technique that allows us to prove a multitude of previously open simulations in QBF...
We aim to understand inherent reasons for lower bounds for QBF proof systems and revisit and compare...
We aim to understand inherent reasons for lower bounds for QBF proof systems, and revisit and compar...
We advance the theory of QBF proof systems by showing the first simulation of the universal checking...
QBF solvers implementing the QCDCL paradigm are powerful algorithms thatsuccessfully tackle many com...
We propose the first general technique for proving genuine lower bounds in expansion-based QBF proof...
Dependency quantified Boolean formulas (DQBFs) are a powerful formalism, which subsumes quantified B...
Several calculi for quantified Boolean formulas (QBFs) exist, but relations between them are not yet...
We provide the first proof complexity results for QBF dependency calculi. By showing that the reflex...
Quantified Boolean Formulas (QBF) and their proof complexity are not as well understood as proposit...
In sharp contrast to classical proof complexity we are currently short of lower bound techniques for...
In sharp contrast to classical proof complexity we are currently short oflower bound techniques for ...
Dependency quantified Boolean formulas (DQBF) and QBF dependency schemes have been treated separatel...
We investigate two QBF resolution systems that use extension variables: weak extended Q-resolution, ...
Proof systems for quantified Boolean formulas (QBFs) provide a theoretical underpinning for the perf...
We pioneer a new technique that allows us to prove a multitude of previously open simulations in QBF...
We aim to understand inherent reasons for lower bounds for QBF proof systems and revisit and compare...
We aim to understand inherent reasons for lower bounds for QBF proof systems, and revisit and compar...
We advance the theory of QBF proof systems by showing the first simulation of the universal checking...
QBF solvers implementing the QCDCL paradigm are powerful algorithms thatsuccessfully tackle many com...
We propose the first general technique for proving genuine lower bounds in expansion-based QBF proof...
Dependency quantified Boolean formulas (DQBFs) are a powerful formalism, which subsumes quantified B...
Several calculi for quantified Boolean formulas (QBFs) exist, but relations between them are not yet...