Sara Negri scite author profile

Structural proof theory is a branch of logic that studies the general structure and properties of logical and mathematical proofs. This book is both a concise introduction to the central results and methods of structural proof theory, and a work of research that will be of interest to specialists. The book is designed to be used by students of philosophy, mathematics and computer science. The book contains a wealth of results on proof-theoretical systems, including extensions of such systems from logic to mathematics, and on the connection between the two main forms of structural proof theory - natural deduction and sequent calculus. The authors emphasize the computational content of logical results. A special feature of the volume is a computerized system for developing proofs interactively, downloadable from the web and regularly updated.

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Proof Analysis in Modal Logic

Negri

2005

J Philos Logic

247

277

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Proof analysis in intermediate logics

Dyckhoff

Negri

2011

Arch. Math. Logic

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Cut Elimination in the Presence of Axioms

1998

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A way 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 in which also cuts on the equality axioms are eliminated.

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Contraction-free sequent calculi for geometric theories with an application to Barr's theorem

Negri¹

2003

Archive for Mathematical Logic

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Sara Negri

Structural Proof Theory

Proof Analysis in Modal Logic

Proof analysis in intermediate logics

Cut Elimination in the Presence of Axioms

Contraction-free sequent calculi for geometric theories with an application to Barr's theorem

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