Disjunction elimination

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In propositional logic, disjunction elimination^[1]^[2] (sometimes named proof by cases, case analysis, or or elimination), is the valid argument form and rule of inference that allows one to eliminate a disjunctive statement from a logical proof. It is the inference that if a statement $P$ implies a statement $Q$ and a statement $R$ also implies $Q$ , then if either $P$ or $R$ is true, then $Q$ has to be true. The reasoning is simple: since at least one of the statements P and R is true, and since either of them would be sufficient to entail Q, Q is certainly true.

If I'm inside, I have my wallet on me.

If I'm outside, I have my wallet on me.

It is true that either I'm inside or I'm outside.

Therefore, I have my wallet on me.

It is the rule can be stated as:

\frac{P \to Q, R \to Q, P \or R}{\therefore Q}

where the rule is that whenever instances of " $P \to Q$ ", and " $R \to Q$ " and " $P \or R$ " appear on lines of a proof, " $Q$ " can be placed on a subsequent line.

Formal notation

The disjunction elimination rule may be written in sequent notation:

(P \to Q), (R \to Q), (P \or R) \vdash Q

where $\vdash$ is a metalogical symbol meaning that $Q$ is a syntactic consequence of $P \to Q$ , and $R \to Q$ and $P \or R$ in some logical system;

and expressed as a truth-functional tautology or theorem of propositional logic:

(((P \to Q) \and (R \to Q)) \and (P \or R)) \to Q

where $P$ , $Q$ , and $R$ are propositions expressed in some formal system.

References

[1] ttps://proofwiki.org/wiki/Rule_of_Or-Elimination

[2] ttp://www.cs.gsu.edu/~cscskp/Automata/proofs/node6.html

[1]

[2]

Disjunction elimination

Formal notation

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References

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