We present an algebraic characterization of the complexity classes Logspace and NLogspace, using an algebra with a composition law based on unification. This new bridge between unification and complexity classes is inspired from proof theory and more specifically linear logic and Geometry of Interaction. We show how unification can be used to build a model of computation by means of specific subalgebras associated to finite permutations groups. We then prove that whether an observation (the algebraic counterpart of a program) accepts a word can be decided within logarithmic space. We also show that the construction can naturally represent pointer machines, an intuitive way of understanding logarithmic space computing
Bounded arithmetic is a branch of mathematical logic which characterize various classes of computati...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
We consider the infinite versions of the usual computational complexity questions LogSpace?=P, NLogS...
Abstract. We present an algebraic characterization of the complexity classes Logspace and NLogspace,...
Abstract. We present an algebraic characterization of the complexity classes Logspace and NLogspace,...
Soumis au numéro spécial de LMCS pour RTA/TLCA 2014 ( http://www.lmcs-online.org/ojs/specialIssues.p...
International audienceWe present an algebraic view on logic programming, related to proof theory and...
Abstract. We present an algebraic view on logic programming, related to proof theory and more specif...
Accepté pour publication dans le numéro spécial consacré à la complexité implicite de Information & ...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
We present applicative theories of words corresponding to weak, and especially logarithmic, complexi...
We refine the techniques of Beigel, Gill, Hertrampf (BGH90) who investigated polynomial time countin...
We show that in the context of nonuniform complexity, nondeterministic logarithmic space bounded com...
This research in Theoretical Computer Science extends the gateways between Linear Logic and Complexi...
A number of complexity classes, most notably ptime, have been characterised by sub-systems of linear...
Bounded arithmetic is a branch of mathematical logic which characterize various classes of computati...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
We consider the infinite versions of the usual computational complexity questions LogSpace?=P, NLogS...
Abstract. We present an algebraic characterization of the complexity classes Logspace and NLogspace,...
Abstract. We present an algebraic characterization of the complexity classes Logspace and NLogspace,...
Soumis au numéro spécial de LMCS pour RTA/TLCA 2014 ( http://www.lmcs-online.org/ojs/specialIssues.p...
International audienceWe present an algebraic view on logic programming, related to proof theory and...
Abstract. We present an algebraic view on logic programming, related to proof theory and more specif...
Accepté pour publication dans le numéro spécial consacré à la complexité implicite de Information & ...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
We present applicative theories of words corresponding to weak, and especially logarithmic, complexi...
We refine the techniques of Beigel, Gill, Hertrampf (BGH90) who investigated polynomial time countin...
We show that in the context of nonuniform complexity, nondeterministic logarithmic space bounded com...
This research in Theoretical Computer Science extends the gateways between Linear Logic and Complexi...
A number of complexity classes, most notably ptime, have been characterised by sub-systems of linear...
Bounded arithmetic is a branch of mathematical logic which characterize various classes of computati...
A notion of log space Turing reducibility is introduced. It is used to define relative notions of lo...
We consider the infinite versions of the usual computational complexity questions LogSpace?=P, NLogS...