Maximal completion (Klein and Hirokawa 2011) is an elegantly simple yet powerful variant of Knuth-Bendix completion. This paper extends the approach to ordered completion and theorem proving as well as normalized completion. An implementation of the different procedures is described, and its practicality is demonstrated by various examples
AbstractMany important computational problems involve finding a maximal (with respect to set inclusi...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
We present extensions of our Isabelle Formalization of Rewriting that cover two historically related...
AbstractWe give in this paper a complete description of the Knuth-Bendix completion algorithm. We pr...
AbstractWe formulate the Knuth-Bendix completion method at an abstract level, as an equational infer...
Proposes a modified predicate completion scheme called the partial predicate completion scheme. It i...
In this paper we give a new abstract framework for the study of Knuth-Bendix type completion procedu...
We present extensions of our Isabelle Formalization of Rewriting that cover two historically related...
summary:In the present paper we investigate the relations between maximal completions of lattice ord...
For many years all known completeness results for Knuth-Bendix completion and ordered paramodulation...
Knuth-Bendix completion is a classical calculus in automated deduction for transforming a set of equ...
Given an equational system, completion procedures compute an equivalent and complete (terminating an...
Some fundamental properties of maximal open sets are obtained, such as decom-position theorem for a ...
Completion procedures, originated from the seminal work of Knuth and Bendix, are well-known as proce...
In this report we give an overview of the development of our new Waldmeisterprover for equational th...
AbstractMany important computational problems involve finding a maximal (with respect to set inclusi...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
We present extensions of our Isabelle Formalization of Rewriting that cover two historically related...
AbstractWe give in this paper a complete description of the Knuth-Bendix completion algorithm. We pr...
AbstractWe formulate the Knuth-Bendix completion method at an abstract level, as an equational infer...
Proposes a modified predicate completion scheme called the partial predicate completion scheme. It i...
In this paper we give a new abstract framework for the study of Knuth-Bendix type completion procedu...
We present extensions of our Isabelle Formalization of Rewriting that cover two historically related...
summary:In the present paper we investigate the relations between maximal completions of lattice ord...
For many years all known completeness results for Knuth-Bendix completion and ordered paramodulation...
Knuth-Bendix completion is a classical calculus in automated deduction for transforming a set of equ...
Given an equational system, completion procedures compute an equivalent and complete (terminating an...
Some fundamental properties of maximal open sets are obtained, such as decom-position theorem for a ...
Completion procedures, originated from the seminal work of Knuth and Bendix, are well-known as proce...
In this report we give an overview of the development of our new Waldmeisterprover for equational th...
AbstractMany important computational problems involve finding a maximal (with respect to set inclusi...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
We present extensions of our Isabelle Formalization of Rewriting that cover two historically related...