Normalization proof for Peano Arithmetic

Archive for Mathematical Logic 54 (7-8):921-940 (2015)
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Abstract

A proof of normalization for a classical system of Peano Arithmetic formulated in natural deduction is given. The classical rule of the system is the rule for indirect proof restricted to atomic formulas. This rule does not, due to the restriction, interfere with the standard detour conversions. The convertible detours, numerical inductions and instances of indirect proof concluding falsity are reduced in a way that decreases a vector assigned to the derivation. By interpreting the expressions of the vectors as ordinals each derivation is assigned an ordinal less than ɛ0. The vector assignment, which proves termination of the procedure, originates in a normalization proof for Gödel’s T by Howard.

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10.1007/s00153-015-0450-y

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References found in this work

Natural deduction: a proof-theoretical study.Dag Prawitz - 1965 - Mineola, N.Y.: Dover Publications.
Consistency of Heyting arithmetic in natural deduction.Annika Kanckos - 2010 - Mathematical Logic Quarterly 56 (6):611-624.
Gentzen’s consistency proof without heightlines.Annika Siders - 2013 - Archive for Mathematical Logic 52 (3-4):449-468.

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