Herbrand's Theorem for Prenex Gödel Logic and its Consequences for Theorem Proving

@inproceedings{Baaz2001HerbrandsTF,
  title={Herbrand's Theorem for Prenex G{\"o}del Logic and its Consequences for Theorem Proving},
  author={Matthias Baaz and Agata Ciabattoni and Christian G. Ferm{\"u}ller},
  booktitle={LPAR},
  year={2001}
}
Herbrand's Theorem for G∞Δ, i.e., Godel logic enriched by the projection operator Δ is proved. As a consequence we obtain a "chain normal form" and a translation of prenex G∞Δ into (order) clause logic, referring to the classical theory of dense total orders with endpoints. A chaining calculus provides a basis for efficient theorem proving. 

Topics from this paper.

Citations

Publications citing this paper.
SHOWING 1-10 OF 23 CITATIONS