AbstractWe provide new characterizations of two previously studied questions on nondeterministic function classes: Q1: Do nondeterministic functions admit efficient deterministic refinements?Q2: Do nondeterministic function classes contain complete functions? We show that Q1 for the class NPMVt is equivalent to the question whether the standard proof system for SAT is p-optimal, and to the assumption that every optimal proof system is p-optimal. Assuming only the existence of a p-optimal proof system for SAT, we show that every set with an optimal proof system has a p-optimal proof system. Under the latter assumption, we also obtain a positive answer to Q2 for the class NPMVt.An alternative view on nondeterministic functions is provided by ...
We investigate the connection between propositional proof systems and their canonical pairs. It is k...
One of the starting points of propositional proof complexity is the seminal paper by Cook and Reckho...
AbstractWe present two results about witness functions for sets in NP and coNP. First, any set that ...
We provide new characterizations of two previously studied questions on nondeter-ministic function c...
We provide new characterizations of two previously studied questions on nondeterministic function cl...
AbstractWe provide new characterizations of two previously studied questions on nondeterministic fun...
For a proof system P we introduce the complexity class DNPP(P) of all disjoint NP-pairs for which th...
this paper we develope a connection between optimal propositional proof systems and structural compl...
Disjoint NP-pairs are a well studied complexity theoretic concept with important applications in cry...
For a propositional proof system P we introduce the complexity class of all disjoint -pairs for whic...
AbstractA polynomial time computable function h:Σ*→Σ* whose range is a set L is called a proof syste...
This paper focuses on the deduction theorem for propositional logic. We define and investigate diffe...
AbstractIn this paper we develop a connection between optimal propositional proof systems and struct...
. J. Kraj'icek and P. Pudl'ak proved that an almost optimal deterministic algorithm for T...
AbstractFor a propositional proof system P we introduce the complexity class DNPP(P) of all disjoint...
We investigate the connection between propositional proof systems and their canonical pairs. It is k...
One of the starting points of propositional proof complexity is the seminal paper by Cook and Reckho...
AbstractWe present two results about witness functions for sets in NP and coNP. First, any set that ...
We provide new characterizations of two previously studied questions on nondeter-ministic function c...
We provide new characterizations of two previously studied questions on nondeterministic function cl...
AbstractWe provide new characterizations of two previously studied questions on nondeterministic fun...
For a proof system P we introduce the complexity class DNPP(P) of all disjoint NP-pairs for which th...
this paper we develope a connection between optimal propositional proof systems and structural compl...
Disjoint NP-pairs are a well studied complexity theoretic concept with important applications in cry...
For a propositional proof system P we introduce the complexity class of all disjoint -pairs for whic...
AbstractA polynomial time computable function h:Σ*→Σ* whose range is a set L is called a proof syste...
This paper focuses on the deduction theorem for propositional logic. We define and investigate diffe...
AbstractIn this paper we develop a connection between optimal propositional proof systems and struct...
. J. Kraj'icek and P. Pudl'ak proved that an almost optimal deterministic algorithm for T...
AbstractFor a propositional proof system P we introduce the complexity class DNPP(P) of all disjoint...
We investigate the connection between propositional proof systems and their canonical pairs. It is k...
One of the starting points of propositional proof complexity is the seminal paper by Cook and Reckho...
AbstractWe present two results about witness functions for sets in NP and coNP. First, any set that ...