Negation introduction
| Type | Rule of inference |
|---|---|
| Field | Propositional calculus |
| Statement | If a given antecedent implies both the consequent and its complement, then the antecedent is a contradiction. |
| Transformation rules |
|---|
| Propositional calculus |
| Rules of inference |
| Rules of replacement |
| Predicate logic |
Negation introduction is a rule of inference, or transformation rule, in the field of propositional calculus.
Negation introduction states that if a given antecedent implies both the consequent and its complement, then the antecedent is a contradiction.[1][2]
Formal notation
This can be written as: [math]\displaystyle{ (P \rightarrow Q) \land (P \rightarrow \neg Q) \rightarrow \neg P }[/math]
An example of its use would be an attempt to prove two contradictory statements from a single fact. For example, if a person were to state "Whenever I hear the phone ringing I am happy" and then state "Whenever I hear the phone ringing I am not happy", one can infer that the person never hears the phone ringing.
Many proofs by contradiction use negation introduction as reasoning scheme: to prove ¬P, assume for contradiction P, then derive from it two contradictory inferences Q and ¬Q. Since the latter contradiction renders P impossible, ¬P must hold.
Proof
| Step | Proposition | Derivation |
|---|---|---|
| 1 | [math]\displaystyle{ (P \to Q)\land(P \to \neg Q) }[/math] | Given |
| 2 | [math]\displaystyle{ (\neg P \lor Q)\land(\neg P \lor \neg Q) }[/math] | Material implication |
| 3 | [math]\displaystyle{ \neg P \lor (Q \land \neg Q) }[/math] | Distributivity |
| 4 | [math]\displaystyle{ \neg P \lor F }[/math] | Law of noncontradiction |
| 5 | [math]\displaystyle{ \neg P }[/math] | Disjunctive syllogism (3,4) |
See also
References
- ↑ Wansing, Heinrich, ed (1996). Negation: A Notion in Focus. Berlin: Walter de Gruyter. ISBN 3110147696.
- ↑ Haegeman, Lilliane (30 Mar 1995). The Syntax of Negation. Cambridge: Cambridge University Press. p. 70. ISBN 0521464927. https://archive.org/details/syntaxofnegation0000haeg.
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