Add to ORKGWe review the fundamental resolution-based methods for first-order theorem proving and present them in a uniform framework. We show that these calculi can be viewed as specializations of non-clausal resolution with simplification. Simplification techniques are justified with the help of a rather general notion of redundancy for inferences. As simplification and other techniques for the elimination of redundancy are indispensable for an acceptable behaviour of any practical theorem prover this work is the first uniform treatment of resolution-like techniques in which the avoidance of redundant computations attains the attention it deserves. In many cases our presentation of a resolution method will indicate new ways of how to improve the met...
AbstractIn this paper we investigate automated theorem proving systems represented as finite classes...
We present an Isabelle/HOL formalization of the first half of Bachmair and Ganzinger’s chapter on re...
This paper is an overview of a variety of results, all centered around a common theme, namely embedd...
We review the fundamental resolution-based methods for first-order theorem proving and present them ...
We review the fundamental resolution-based methods for first-order theorem proving and present them ...
We present a way of transforming a resolution proof containing Skolemization into a natural deductio...
AbstractIn this paper we investigate automated theorem proving systems represented as finite classes...
We present a way of transforming a resolution proof containing Skolemization into a natural deductio...
We present a way of transforming a resolution-style proof containing Skolemization into a natural de...
We study several procedures for theorem proving based on the resolution principle. We consider (1) D...
AbstractWe present a way of transforming a resolution-style proof containing Skolemization into a na...
ABSTRACT. The resolution principle, an automatic inference technique, is studied as a possible decis...
We transform a user-friendly formulation of aproblem to a machine-friendly one exploiting the variab...
We present a way of transforming a resolution-style proof containing Skolemization into a natural de...
A straightforward formulation of a mathematical problem is mostly not ad-equate for resolution theor...
AbstractIn this paper we investigate automated theorem proving systems represented as finite classes...
We present an Isabelle/HOL formalization of the first half of Bachmair and Ganzinger’s chapter on re...
This paper is an overview of a variety of results, all centered around a common theme, namely embedd...
We review the fundamental resolution-based methods for first-order theorem proving and present them ...
We review the fundamental resolution-based methods for first-order theorem proving and present them ...
We present a way of transforming a resolution proof containing Skolemization into a natural deductio...
AbstractIn this paper we investigate automated theorem proving systems represented as finite classes...
We present a way of transforming a resolution proof containing Skolemization into a natural deductio...
We present a way of transforming a resolution-style proof containing Skolemization into a natural de...
We study several procedures for theorem proving based on the resolution principle. We consider (1) D...
AbstractWe present a way of transforming a resolution-style proof containing Skolemization into a na...
ABSTRACT. The resolution principle, an automatic inference technique, is studied as a possible decis...
We transform a user-friendly formulation of aproblem to a machine-friendly one exploiting the variab...
We present a way of transforming a resolution-style proof containing Skolemization into a natural de...
A straightforward formulation of a mathematical problem is mostly not ad-equate for resolution theor...
AbstractIn this paper we investigate automated theorem proving systems represented as finite classes...
We present an Isabelle/HOL formalization of the first half of Bachmair and Ganzinger’s chapter on re...
This paper is an overview of a variety of results, all centered around a common theme, namely embedd...