We introduce a new complexity measure, $QN[f(n)]$, which clocks the size of sentences from predicate calculus needed to express a given property. Techniques from logic are used to prove sharp lower bounds in the measure. These results demonstrate space requirements for computations and may provide techniques for separating Time and Space complexity classes because we show that: $NSPACE [f(n)] \subseteq QN[f(n)^{2}/log(n)] \subseteq DSPACE[f(n)^{2}].
AbstractWe study first order expressibility as a measure of complexity. We introduce the new class V...
We introduce a refinement of the usual Ehrenfeucht-Fra\"{\i}ss\'e game. The new game will help us ma...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
AbstractWe analyze the computational complexity of determining whether F is satisfiable when F is a ...
We identify two new big clusters of proof complexity measures equivalent up to polynomial and log n ...
ropositional proof complexity is the study of the resources that are needed to prove formulas in pro...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
In 1981, Neil Immerman described a two-player game, which he called the "separability game" \cite{Im...
AbstractWe introduce a new way to measure the space needed in resolution refutations of CNF formulas...
In this paper, we explore the computational complexity of the conjunctive fragment of the first-orde...
In this paper we prove that the set of properties checkable by a Turing machine in DSPACE[n k ] is...
This week we will talk about space complexity. We started at poly-time (P) to investigate time compl...
Several measures of syntactic complexity in mathematical linguistics allow infinitely many sentences...
Motivated by the question of how to define an analog of interactive proofs in the setting of logarit...
This paper considers the structure consisting of the set of all words over a given alphabet together...
AbstractWe study first order expressibility as a measure of complexity. We introduce the new class V...
We introduce a refinement of the usual Ehrenfeucht-Fra\"{\i}ss\'e game. The new game will help us ma...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...
AbstractWe analyze the computational complexity of determining whether F is satisfiable when F is a ...
We identify two new big clusters of proof complexity measures equivalent up to polynomial and log n ...
ropositional proof complexity is the study of the resources that are needed to prove formulas in pro...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
In 1981, Neil Immerman described a two-player game, which he called the "separability game" \cite{Im...
AbstractWe introduce a new way to measure the space needed in resolution refutations of CNF formulas...
In this paper, we explore the computational complexity of the conjunctive fragment of the first-orde...
In this paper we prove that the set of properties checkable by a Turing machine in DSPACE[n k ] is...
This week we will talk about space complexity. We started at poly-time (P) to investigate time compl...
Several measures of syntactic complexity in mathematical linguistics allow infinitely many sentences...
Motivated by the question of how to define an analog of interactive proofs in the setting of logarit...
This paper considers the structure consisting of the set of all words over a given alphabet together...
AbstractWe study first order expressibility as a measure of complexity. We introduce the new class V...
We introduce a refinement of the usual Ehrenfeucht-Fra\"{\i}ss\'e game. The new game will help us ma...
Algebraic proof systems, such as Polynomial Calculus (PC) and Polynomial Calculus with Resolution (P...