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Full Idea
The Deduction Theorem is what licenses a system of 'natural deduction' in the first place.
Gist of Idea
The Deduction Theorem is what licenses a system of natural deduction
Source
David Bostock (Philosophy of Mathematics [2009], 7.2)
Book Ref
Bostock,David: 'Philosophy of Mathematics: An Introduction' [Wiley-Blackwell 2009], p.202
Related Ideas
Idea 15341 Deduction Theorem: ψ only derivable from φ iff φ→ψ are axioms [Horsten]
Idea 13524 Deduction Theorem: T∪{P}|-Q, then T|-(P→Q), which justifies Conditional Proof [Wolf,RS]
Idea 13615 'Conditonalised' inferences point to the Deduction Theorem: If Γ,φ|-ψ then Γ|-φ→ψ [Bostock]
13832 | Natural deduction shows the heart of reasoning (and sequent calculus is just a tool) [Gentzen, by Hacking] |
13753 | Natural deduction takes proof from assumptions (with its rules) as basic, and axioms play no part [Bostock] |
13755 | Excluded middle is an introduction rule for negation, and ex falso quodlibet will eliminate it [Bostock] |
13754 | Natural deduction rules for → are the Deduction Theorem (→I) and Modus Ponens (→E) [Bostock] |
13758 | In natural deduction we work from the premisses and the conclusion, hoping to meet in the middle [Bostock] |
18120 | The Deduction Theorem is what licenses a system of natural deduction [Bostock] |
13823 | In natural deduction, inferences are atomic steps involving just one logical constant [Prawitz] |
10602 | A 'natural deduction system' has no axioms but many rules [Smith,P] |
21612 | Or-elimination is 'Argument by Cases'; it shows how to derive C from 'A or B' [Williamson] |
13685 | Natural deduction helpfully allows reasoning with assumptions [Sider] |
19298 | Unlike axiom proofs, natural deduction proofs needn't focus on logical truths and theorems [Hale] |
18783 | Many-valued logics lack a natural deduction system [Mares] |
15001 | 'Tonk' is supposed to follow the elimination and introduction rules, but it can't be so interpreted [Sider] |
18800 | Introduction rules give deduction conditions, and Elimination says what can be deduced [Rumfitt] |