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20710016 THEOREMS IN LOGIC 1 in Philosophy L-5 TORTORA DE FALCO LORENZO
(syllabus)
Part 1: Some preliminary notions. Order relations and trees, inductive definitions, proofs by induction, axiom of choice and Kőnig's lemma.
Part 2: Provability and satisyability. First order formal language: alphabet, terms, formulas, sequents. Structures for first order languages: structures, terms and formulas with parameters in a structure, value of terms, formulas and sequents. The calculus of sequents for first order logic: Gentzen's LK. Derivable sequents and derivations. Correctness of the rules of LK. Canonical analysis and fundamental theorem: construction of the canonical analysis (with and without cuts) and proof of the fundamental theorem of the canonical analysis. Consequences of the fundamental theorem: completeness theorem, compactness theorem, eliminability of cuts, L"owenheim-Skolem's theorem.
Part 3: Towards proof-theory: the cut-elimination theorem. The cut-elimination procedure. Definition of the elementary steps of cut-elimination. First proof strategy (big reduction steps). Second proof strategy (reversion of derivations). The complexity of the cut-elimination procedure (sketch). Some immediate consequences of the cut-elimination theorem.
(reference books)
V.M. Abrusci, L. Tortora de Falco, Logica Volume 1- Dimostrazioni e modelli al primo ordine. Springer, (2014).
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