In this paper we present the formalization of a decision procedure for Propositional Logic based on polynomial normalization. This formalization is suitable for its automatic verification in an applicative logic like Acl2. This application of polynomials has been developed by reusing a previous work on polynomial rings [19], showing that a proper formalization leads to a high level of reusability. Two checkers are defined: the first for contradiction formulas and the second for tautology formulas. The main theorems state that both checkers are sound and complete. Moreover, functions for generating models and counterexamples of formulas are provided. This facility plays also an important role in the main proofs. Finally, it is shown that thi...
AbstractWe study possible formulations of algebraic propositional proof systems operating with nonco...
The high computational complexity of advanced reasoning tasks such as belief revision and planning c...
We present an algebraic method designed to deal with with reliability in propositional logic. Our ap...
ACL2 is a computational logic, an automated reasoning system and an applicative programming language...
In this paper, we present the formal verification of a Common Lisp implementation of Buchberger’s a...
The application of automated reasoning to the formal verification of symbolic computation systems i...
sem informaçãoThis paper surveys some results on the role of formal polynomials as a representation ...
A detailed exposition of foundations of a logic-algebraic model for reasoning with knowledge bases ...
We propose an algebraization of classical and non-classical logics, based on factor varieties and de...
Introduction The Boolean ring or first-order polynomial based theorem proving began with the work o...
We present four equational theories that are isomorphic to the traditional Boolean theory and show t...
Minimal Polynomial Logic (MPL) is a generalisation of classical propositional logic which allows tru...
This paper presents a formally verified decision procedure for determinining the satisfiability of a...
Abstract. As of version 2.7, the ACL2 theorem prover has been extended to automatically verify sets ...
This work develops new automated reasoning techniques for verifying the correctness of equationally ...
AbstractWe study possible formulations of algebraic propositional proof systems operating with nonco...
The high computational complexity of advanced reasoning tasks such as belief revision and planning c...
We present an algebraic method designed to deal with with reliability in propositional logic. Our ap...
ACL2 is a computational logic, an automated reasoning system and an applicative programming language...
In this paper, we present the formal verification of a Common Lisp implementation of Buchberger’s a...
The application of automated reasoning to the formal verification of symbolic computation systems i...
sem informaçãoThis paper surveys some results on the role of formal polynomials as a representation ...
A detailed exposition of foundations of a logic-algebraic model for reasoning with knowledge bases ...
We propose an algebraization of classical and non-classical logics, based on factor varieties and de...
Introduction The Boolean ring or first-order polynomial based theorem proving began with the work o...
We present four equational theories that are isomorphic to the traditional Boolean theory and show t...
Minimal Polynomial Logic (MPL) is a generalisation of classical propositional logic which allows tru...
This paper presents a formally verified decision procedure for determinining the satisfiability of a...
Abstract. As of version 2.7, the ACL2 theorem prover has been extended to automatically verify sets ...
This work develops new automated reasoning techniques for verifying the correctness of equationally ...
AbstractWe study possible formulations of algebraic propositional proof systems operating with nonco...
The high computational complexity of advanced reasoning tasks such as belief revision and planning c...
We present an algebraic method designed to deal with with reliability in propositional logic. Our ap...