Title :
A sequent calculus for nominal logic
Author :
Gabbay, Murdoch ; Cheney, James
Author_Institution :
LIX Ecole Polytechnique, France
Abstract :
Nominal logic is a theory of names and binding based on the primitive concepts of freshness and swapping, with a self-dual N- (or "new")-quantifier, originally presented as a Hilbert-style axiom system extending first-order logic. We present a sequent calculus for nominal logic called fresh logic, or FL, admitting cut-elimination. We use FL to provide a proof-theoretic foundation for nominal logic programming and show how to interpret FOλ∇, another logic with a self-dual quantifier, within FL.
Keywords :
Hilbert spaces; process algebra; theorem proving; FOλ∇; Hilbert-style axiom; cut-elimination; first-order logic; fresh logic; logic programming; nominal logic; proof theory; self-dual N-quantifier; sequent calculus; Calculus; Computer science; Concrete; Data security; Humans; Logic programming; Neodymium; Protocols;
Conference_Titel :
Logic in Computer Science, 2004. Proceedings of the 19th Annual IEEE Symposium on
Print_ISBN :
0-7695-2192-4
DOI :
10.1109/LICS.2004.1319608
