论文信息 - Cut Elimination in the Presence of Axioms

Cut Elimination in the Presence of Axioms

Away is found to add axioms to sequent calculi that maintains the eliminability of cut, through the representation of axioms as rules of inference of a suitable form. By this method, the structural analysis of proofs is extended from pure logic to free-variable theories, covering all classical theories, and a wide class of constructive theories. All results are proved for systems in which also the rules of weakening and contraction can be eliminated. Applications include a system of predicate logic with equality inwhich also cuts on the equality axioms are eliminated. §

Sara Negri | Jan von Plato | J. Plato | Sara Negri

[1] Lev Gordeev,et al. Basic proof theory , 1998 .

[2] M. E. Szabo,et al. The collected papers of Gerhard Gentzen , 1969 .

[3] Sara Negri. Sequent calculus proof theory of intuitionistic apartness and order relations , 1999, Arch. Math. Log..

[4] G. Gentzen. Untersuchungen über das logische Schließen. I , 1935 .

[5] T. Uesu. An axiomatization of the apartness fragment of the theory DLO+ of dense linear order , 1984 .

[6] J. Girard. Proof Theory and Logical Complexity , 1989 .

[7] A. G. Dragálin. Mathematical Intuitionism. Introduction to Proof Theory , 1988 .

[8] Lars Hallnäs,et al. A Proof-Theoretic Approach to Logic Programming. I. Clauses as Rules , 1990, J. Log. Comput..