Disjunction introduction

Disjunction introduction
Type	Rule of inference
Field	Propositional calculus
Statement	If $P$ is true, then $P$ or $Q$ must be true.
Symbolic statement	${\frac {P}{\therefore P\lor Q}}$

Transformation rules
Propositional calculus
Rules of inference
Implication introduction / elimination (modus ponens) Biconditional introduction / elimination Conjunction introduction / elimination Disjunction introduction / elimination Disjunctive / hypothetical syllogism Constructive / destructive dilemma Absorption / modus tollens / modus ponendo tollens Negation introduction
Rules of replacement
Associativity Commutativity Distributivity Double negation De Morgan's laws Transposition Material implication Exportation Tautology
Predicate logic
Rules of inference
Universal generalization / instantiation Existential generalization / instantiation

Disjunction introduction or addition (also called or introduction)^[1]^[2]^[3] is a rule of inference of propositional logic and almost every other deduction system. The rule makes it possible to introduce disjunctions to logical proofs. It is the inference that if P is true, then P or Q must be true.

An example in English:

Socrates is a man.

Therefore, Socrates is a man or pigs are flying in formation over the English Channel.

The rule can be expressed as:

{\frac {P}{\therefore P\lor Q}}

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

More generally it's also a simple valid argument form, this means that if the premise is true, then the conclusion is also true as any rule of inference should be, and an immediate inference, as it has a single proposition in its premises.

Disjunction introduction is not a rule in some paraconsistent logics because in combination with other rules of logic, it leads to explosion (i.e. everything becomes provable) and paraconsistent logic tries to avoid explosion and to be able to reason with contradictions. One of the solutions is to introduce disjunction with over rules. See Paraconsistent logic § Tradeoffs.

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Formal notation

The disjunction introduction rule may be written in sequent notation:

P\vdash (P\lor Q)

where $\vdash$ is a metalogical symbol meaning that $P\lor Q$ is a syntactic consequence of $P$ in some logical system;

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

P\to (P\lor Q)

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

References

^ Hurley, Patrick J. (2014). A Concise Introduction to Logic (12th ed.). Cengage. pp. 401–402, 707. ISBN 978-1-285-19654-1.
^ Moore, Brooke Noel; Parker, Richard (2015). "Deductive Arguments II Truth-Functional Logic". Critical Thinking (11th ed.). New York: McGraw Hill. p. 311. ISBN 978-0-07-811914-9.
^ Copi, Irving M.; Cohen, Carl; McMahon, Kenneth (2014). Introduction to Logic (14th ed.). Pearson. pp. 370, 618. ISBN 978-1-292-02482-0.

This page was last edited on 13 June 2022, at 16:43

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Transcription

Formal notation

References