Add to ORKGWe introduce refutationally complete superposition calculi for intentional and extensional clausal $\lambda$-free higher-order logic, two formalisms that allow partial application and applied variables. The calculi are parameterized by a term order that need not be fully monotonic, making it possible to employ the $\lambda$-free higher-order lexicographic path and Knuth-Bendix orders. We implemented the calculi in the Zipperposition prover and evaluated them on Isabelle/HOL and TPTP benchmarks. They appear promising as a stepping stone towards complete, highly efficient automatic theorem provers for full higher-order logic
We provide the following supplementary material for our paper. The longer version of our paper can b...
International audienceWe present a complete superposition calculus for first-order logic with an int...
We present a pragmatic approach to extending a Boolean-free higher-order superposition calculus to s...
International audienceWe introduce refutationally complete superposition calculi for intentional and...
International audienceWe designed a superposition calculus for a clausal fragment of extensional pol...
International audienceWe recently designed two calculi as stepping stones towards superposition for ...
We designed a superposition calculus for a clausal fragment of extensional polymorphic higher-order ...
International audienceSuperposition is among the most successful calculi for first-order logic. Its ...
We recently designed two calculi as stepping stones towards superposition for full higher-order logi...
International audienceWe generalize the recursive path order (RPO) to higher-order terms without λ-a...
International audienceDecades of work have gone into developing efficient proof calculi, data struct...
In the last decades, proof assistants have been immeasurably useful in formally proving validity of ...
International audienceDecades of work have gone into developing efficient proof calculi, data struct...
International audienceWe generalize the Knuth-Bendix order (KBO) to higher-order terms without λ-abs...
We provide the following supplementary material for our article. Zipperposition Compilation instru...
We provide the following supplementary material for our paper. The longer version of our paper can b...
International audienceWe present a complete superposition calculus for first-order logic with an int...
We present a pragmatic approach to extending a Boolean-free higher-order superposition calculus to s...
International audienceWe introduce refutationally complete superposition calculi for intentional and...
International audienceWe designed a superposition calculus for a clausal fragment of extensional pol...
International audienceWe recently designed two calculi as stepping stones towards superposition for ...
We designed a superposition calculus for a clausal fragment of extensional polymorphic higher-order ...
International audienceSuperposition is among the most successful calculi for first-order logic. Its ...
We recently designed two calculi as stepping stones towards superposition for full higher-order logi...
International audienceWe generalize the recursive path order (RPO) to higher-order terms without λ-a...
International audienceDecades of work have gone into developing efficient proof calculi, data struct...
In the last decades, proof assistants have been immeasurably useful in formally proving validity of ...
International audienceDecades of work have gone into developing efficient proof calculi, data struct...
International audienceWe generalize the Knuth-Bendix order (KBO) to higher-order terms without λ-abs...
We provide the following supplementary material for our article. Zipperposition Compilation instru...
We provide the following supplementary material for our paper. The longer version of our paper can b...
International audienceWe present a complete superposition calculus for first-order logic with an int...
We present a pragmatic approach to extending a Boolean-free higher-order superposition calculus to s...