AbstractThe computation tree of a nondeterministic machineMwith inputxgives rise to aleaf stringformed by concatenating the outcomes of all the computations in the tree in lexicographical order. We may characterize problems by considering, for a particular “leaf language”Y, the set of allxfor which the leaf string ofMis contained inY. In this way, in the context of polynomial time computation, leaf languages were shown to capture many complexity classes. In this paper, we study the expressibility of the leaf language mechanism in the contexts of logarithmic space and of logarithmic time computation. We show that logspace leaf languages yield a much finer classification scheme for complexity classes than polynomial time leaf languages, captu...
AbstractWe define the counting classes #NC1,GapNC1,PNC1, andC=NC1. We prove that boolean circuits, a...
AbstractA programming approach to computability and complexity theory yields more natural definition...
International audienceWe present an algebraic view on logic programming, related to proof theory and...
AbstractThe size of an accepting computation tree of an alternating Turing machine (ATM) is introduc...
Tight connections between leafs languages and strings compressed via straight-line programs (SLPs) a...
We introduce second-order Lindström quantifiers and examine analogies to the concept of leaf languag...
A longstanding open problem in complexity theory is whether the class Polytime (P) is the same as Lo...
AbstractWe consider the logarithmic-space counting and optimization classes #L, span-L, and opt-L, w...
AbstractThe complexity class LOGCFL consists of all languages (or decision problems) which are logsp...
AbstractTight connections between leaf languages and strings compressed by straight-line programs (S...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
Unger studied the balanced leaf languages defined via poly-logarithmically sparse leaf pattern sets....
For a nondeterministic polynomial time Turing machine M and an input string x, the leaf string of M ...
Abstract. We present an algebraic view on logic programming, related to proof theory and more specif...
We consider the logarithmic space counting classes #L, opt-L, and span-L, which are defined analogou...
AbstractWe define the counting classes #NC1,GapNC1,PNC1, andC=NC1. We prove that boolean circuits, a...
AbstractA programming approach to computability and complexity theory yields more natural definition...
International audienceWe present an algebraic view on logic programming, related to proof theory and...
AbstractThe size of an accepting computation tree of an alternating Turing machine (ATM) is introduc...
Tight connections between leafs languages and strings compressed via straight-line programs (SLPs) a...
We introduce second-order Lindström quantifiers and examine analogies to the concept of leaf languag...
A longstanding open problem in complexity theory is whether the class Polytime (P) is the same as Lo...
AbstractWe consider the logarithmic-space counting and optimization classes #L, span-L, and opt-L, w...
AbstractThe complexity class LOGCFL consists of all languages (or decision problems) which are logsp...
AbstractTight connections between leaf languages and strings compressed by straight-line programs (S...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
Unger studied the balanced leaf languages defined via poly-logarithmically sparse leaf pattern sets....
For a nondeterministic polynomial time Turing machine M and an input string x, the leaf string of M ...
Abstract. We present an algebraic view on logic programming, related to proof theory and more specif...
We consider the logarithmic space counting classes #L, opt-L, and span-L, which are defined analogou...
AbstractWe define the counting classes #NC1,GapNC1,PNC1, andC=NC1. We prove that boolean circuits, a...
AbstractA programming approach to computability and complexity theory yields more natural definition...
International audienceWe present an algebraic view on logic programming, related to proof theory and...