AbstractIt is widely believed that a family Σn of unsatisfiable formulae proposed by Cook and Reckhow in their landmark paper (Proc. ACM Symp. on Theory of Computing, 1974) can be used to give a lower bound of 2Ω(2n) on the proof size with analytic tableaux. This claim plays a key role in the proof that tableaux cannot polynomially simulate tree resolution. We exhibit an analytic tableau proof for Σn for whose size we prove an upper bound of O(2n2), which, although not polynomial in the size O(2n) of the input formula, is exponentially shorter than the claimed lower bound. An analysis of the proofs published in the literature reveals that the pitfall is the blurring of n-ary (clausal) and binary versions of tableaux. A consequence of this a...
We examine the proof-theoretic strength of parameterized tree-like resolution—a proof sys-tem for th...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
for the predicate calculus as to obtain a direct proof (without using compactness) of the fact that ...
AbstractIt is widely believed that a family Σn of unsatisfiable formulae proposed by Cook and Reckho...
This thesis explores the relative complexity of proofs produced by the automatic theorem proving pro...
We show that Smullyan's analytic tableaux cannot p-simulate the truth-tables. We identify the c...
AbstractThe last years have seen two major advances in Knowledge Representation and Reasoning. First...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
We show that Smullyan's analytic tableaux cannot p-simulate the truth-tables. We identify the cause ...
In 1979 Valiant showed that the complexity class VPe of families with polynomially bounded formula s...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
This report deals with propositional satisfiability checking. Most successful satisfiability checker...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
We identify two new big clusters of proof complexity measures equivalent up to polynomial and log n ...
We examine the proof-theoretic strength of parameterized tree-like resolution—a proof sys-tem for th...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
for the predicate calculus as to obtain a direct proof (without using compactness) of the fact that ...
AbstractIt is widely believed that a family Σn of unsatisfiable formulae proposed by Cook and Reckho...
This thesis explores the relative complexity of proofs produced by the automatic theorem proving pro...
We show that Smullyan's analytic tableaux cannot p-simulate the truth-tables. We identify the c...
AbstractThe last years have seen two major advances in Knowledge Representation and Reasoning. First...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
We show that Smullyan's analytic tableaux cannot p-simulate the truth-tables. We identify the cause ...
In 1979 Valiant showed that the complexity class VPe of families with polynomially bounded formula s...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
This report deals with propositional satisfiability checking. Most successful satisfiability checker...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
We identify two new big clusters of proof complexity measures equivalent up to polynomial and log n ...
We examine the proof-theoretic strength of parameterized tree-like resolution—a proof sys-tem for th...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
for the predicate calculus as to obtain a direct proof (without using compactness) of the fact that ...