We obtain a streamlined proof of an important result by Alekhnovich and Razborov [Michael Alekhnovich and Alexander A. Razborov, 2008], showing that it is hard to automatize both tree-like and general Resolution. Under a different assumption than [Michael Alekhnovich and Alexander A. Razborov, 2008], our simplified proof gives improved bounds: we show under ETH that these proof systems are not automatizable in time n^f(n), whenever f(n) = o(log^{1/7 - epsilon} log n) for any epsilon > 0. Previously non-automatizability was only known for f(n) = O(1). Our proof also extends fairly straightforwardly to prove similar hardness results for PCR and Res(r)
During the last decade, an active line of research in proof complexity has been to study space comp...
Variants of the Exponential Time Hypothesis (ETH) have been used to derive lower bounds on the time ...
Res(s) is an extension of Resolution working on s-DNFs. We prove tight nΩ(k) lower bounds for the si...
AbstractA propositional proof system is automatizable if there is an algorithm that, given a tautolo...
A propositional proof system is automatizable if there is an algorithm that, given a tautology, pro...
We show that the problem of finding a Resolution refutation that is at most polynomially longer than...
A propositional proof system R is called automatizable if there is an algorithm that produces for ev...
In this abstract of my talk I present results on the automatizability of proof systems. Besides the ...
We explore the relationships between the computational problem of recognizing expander graphs, and t...
AbstractWe analyze size and space complexity of Res(k), a family of propositional proof systems intr...
We show that it is NP-hard to distinguish formulas that have Resolution refutations of almost linear...
The Strong Exponential Time Hypothesis (SETH) asserts that for every $\varepsilon>0$ there exists $k...
In a breathtaking breakthrough, Atserias and Muller (FOCS'19, Best Paper) settled the complexity of ...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
During the last decade, an active line of research in proof complexity has been to study space comp...
Variants of the Exponential Time Hypothesis (ETH) have been used to derive lower bounds on the time ...
Res(s) is an extension of Resolution working on s-DNFs. We prove tight nΩ(k) lower bounds for the si...
AbstractA propositional proof system is automatizable if there is an algorithm that, given a tautolo...
A propositional proof system is automatizable if there is an algorithm that, given a tautology, pro...
We show that the problem of finding a Resolution refutation that is at most polynomially longer than...
A propositional proof system R is called automatizable if there is an algorithm that produces for ev...
In this abstract of my talk I present results on the automatizability of proof systems. Besides the ...
We explore the relationships between the computational problem of recognizing expander graphs, and t...
AbstractWe analyze size and space complexity of Res(k), a family of propositional proof systems intr...
We show that it is NP-hard to distinguish formulas that have Resolution refutations of almost linear...
The Strong Exponential Time Hypothesis (SETH) asserts that for every $\varepsilon>0$ there exists $k...
In a breathtaking breakthrough, Atserias and Muller (FOCS'19, Best Paper) settled the complexity of ...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
During the last decade, an active line of research in proof complexity has been to study space comp...
Variants of the Exponential Time Hypothesis (ETH) have been used to derive lower bounds on the time ...
Res(s) is an extension of Resolution working on s-DNFs. We prove tight nΩ(k) lower bounds for the si...