During the last decade, an active line of research in proof complexity has been into the space complexity of proofs and how space is related to other measures. By now these aspects of resolution are fairly well understood, but many open problems remain for the related but stronger polynomial calculus (PC/PCR) proof system. For instance, the space complexity of many standard “benchmark formulas ” is still open, as well as the relation of space to size and degree in PC/PCR. We prove that if a formula requires large resolution width, then making XOR substitution yields a formula requiring large PCR space, providing some circumstantial evidence that degree might be a lower bound for space. More importantly, this immediately yields formulas that...
We prove that a family of polynomials encoding a Graph Ordering Principle (GOP(G)) requires refutati...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
During the last decade, an active line of research in proof complexity has been into the space compl...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
During the last decade, an active line of research in proof complexity has been to study space comp...
We study the problem of obtaining lower bounds for polynomial calculus (PC) and polynomial calculus ...
We study the problem of establishing lower bounds for polynomial calculus (PC) and polynomial calcul...
There are methods to turn short refutations in Polynomial Calculus (PC) and Polyno-mial Calculus wit...
There are methods to turn short refutations in polynomial calculus (PC)and polynomial calculus with ...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
We introduce an algebraic proof system Pcrk, which combines together Polynomial Calculus (Pc) and k-...
ropositional proof complexity is the study of the resources that are needed to prove formulas in pro...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
We prove that a family of polynomials encoding a Graph Ordering Principle (GOP(G)) requires refutati...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
During the last decade, an active line of research in proof complexity has been into the space compl...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
During the last decade, an active line of research in proof complexity has been to study space comp...
We study the problem of obtaining lower bounds for polynomial calculus (PC) and polynomial calculus ...
We study the problem of establishing lower bounds for polynomial calculus (PC) and polynomial calcul...
There are methods to turn short refutations in Polynomial Calculus (PC) and Polyno-mial Calculus wit...
There are methods to turn short refutations in polynomial calculus (PC)and polynomial calculus with ...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
We introduce an algebraic proof system Pcrk, which combines together Polynomial Calculus (Pc) and k-...
ropositional proof complexity is the study of the resources that are needed to prove formulas in pro...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
We prove that a family of polynomials encoding a Graph Ordering Principle (GOP(G)) requires refutati...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...