An algorithm is presented which eliminates second-order quantifiers over predicate variables in formulae of type $\exists P_1, \ldots, P_n \psi$ where $\psi$ is an arbitrary formula of first-order predicate logic. The resulting formula is equivalent to the original formula - if the algorithm terminates. The algorithm can for example be applied to do interpolation, to eliminate the second-order quantifiers in circumscription, to compute the correlations between structures and power structures, to compute semantic properties corresponding to Hilbert axioms in non classical logics and to compute model theoretic semantics for new logics
The automation of reasoning has been an aim of research for a long time. Already in 17th century, th...
AbstractWe consider the expressive power of second-order generalized quantifiers on finite structure...
We develop quantifier elimination procedures for a fragment of higher order logic arising from the f...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
The concept of generalized quantifiers, as defined by Lindström, for some purposes is too general. ...
We analyze computational aspects of partially ordered quantification i first-order logic. show that ...
We present a formally verified quantifier elimination procedure for the first order theory over line...
hello Quanti¯er elimination refers to the process of transforming a ¯rst-order formula ' into a...
AbstractIn 1985, van den Dries showed that the theory of the reals with a predicate for the integer ...
AbstractThe problem of eliminating second-order quantification over predicate symbols is in general ...
We establish a framework to integrate propositional logic with firstorder logic. This is done in su...
We consider the integers using the language of ordered rings extended by ternary symbols for congrue...
Second-order quantified Boolean formulas (SOQBFs) generalize quantified Boolean formulas (QBFs) by a...
Projection and forgetting are tools that allow to express a variety of tasks in knowledge pro-cessin...
The automation of reasoning has been an aim of research for a long time. Already in 17th century, th...
AbstractWe consider the expressive power of second-order generalized quantifiers on finite structure...
We develop quantifier elimination procedures for a fragment of higher order logic arising from the f...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
An algorithm is presented which eliminates second-order quantifiers over predicate variables in form...
The concept of generalized quantifiers, as defined by Lindström, for some purposes is too general. ...
We analyze computational aspects of partially ordered quantification i first-order logic. show that ...
We present a formally verified quantifier elimination procedure for the first order theory over line...
hello Quanti¯er elimination refers to the process of transforming a ¯rst-order formula ' into a...
AbstractIn 1985, van den Dries showed that the theory of the reals with a predicate for the integer ...
AbstractThe problem of eliminating second-order quantification over predicate symbols is in general ...
We establish a framework to integrate propositional logic with firstorder logic. This is done in su...
We consider the integers using the language of ordered rings extended by ternary symbols for congrue...
Second-order quantified Boolean formulas (SOQBFs) generalize quantified Boolean formulas (QBFs) by a...
Projection and forgetting are tools that allow to express a variety of tasks in knowledge pro-cessin...
The automation of reasoning has been an aim of research for a long time. Already in 17th century, th...
AbstractWe consider the expressive power of second-order generalized quantifiers on finite structure...
We develop quantifier elimination procedures for a fragment of higher order logic arising from the f...