We explore connections between polyhedral projection and inference in propositional logic. We formulate the problem of drawing all inferences that contain a restricted set of atoms (i.e., all inferences that pertain to a given question) as a logical projection problem. We show that polyhedral projection partially solves this problem and in particular derives precisely those inferences that can be obtained by a certain form of unit resolution. We prove that this unit resolution algorithm is exponential in the number of atoms in the restricted set but is polynomial in the problem size when this number of fixed. We also survey a number of new satisfiability algorithms that have been suggested by the polyhedral interpretation of propositional l...
AbstractThe cutting plane refutation system CP for propositional logic is an extension of resolution...
We consider the problem of projecting a point in a polyhedral set onto the boundary of the set using...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...
Projection of polyhedral sets is a fundamental operation in both geometry and symbolic computation. ...
In a logic program the feasible argument sizes of derivable facts involving an n-ary predicate are v...
Proving formulas in propositional logic can be done in different ways. Some of these are based on of...
The original publication is available at www.springerlink.com. The decision problem for provability ...
This note brings together two fundamental topics: polyhedral projection and parametric linear progra...
Thesis (Ph. D.)--University of Washington, 2005.This thesis explores algorithmic applications of pro...
International audienceThis paper describes two algorithms for the compression of propositional resol...
This paper illustrates how the application of integer programming to logic can reveal parallels betw...
We investigate a class of set constraints defined as atomic set constraints augmented with projectio...
Extending linear constraints by admitting parameters allows for more abstract problem modeling and r...
We investigate a class of set constraints defined as atomic set constraints augmented with projecti...
International audienceThe polyhedral model mixes recurrence equations over polyhedral domains and af...
AbstractThe cutting plane refutation system CP for propositional logic is an extension of resolution...
We consider the problem of projecting a point in a polyhedral set onto the boundary of the set using...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...
Projection of polyhedral sets is a fundamental operation in both geometry and symbolic computation. ...
In a logic program the feasible argument sizes of derivable facts involving an n-ary predicate are v...
Proving formulas in propositional logic can be done in different ways. Some of these are based on of...
The original publication is available at www.springerlink.com. The decision problem for provability ...
This note brings together two fundamental topics: polyhedral projection and parametric linear progra...
Thesis (Ph. D.)--University of Washington, 2005.This thesis explores algorithmic applications of pro...
International audienceThis paper describes two algorithms for the compression of propositional resol...
This paper illustrates how the application of integer programming to logic can reveal parallels betw...
We investigate a class of set constraints defined as atomic set constraints augmented with projectio...
Extending linear constraints by admitting parameters allows for more abstract problem modeling and r...
We investigate a class of set constraints defined as atomic set constraints augmented with projecti...
International audienceThe polyhedral model mixes recurrence equations over polyhedral domains and af...
AbstractThe cutting plane refutation system CP for propositional logic is an extension of resolution...
We consider the problem of projecting a point in a polyhedral set onto the boundary of the set using...
Abstract. We consider proof systems for effectively propositional logic. First, we show that proposi...