Existential Quantifier

BE /ˌɛgzɪˈstɛnʃəl ˈkwɒntɪfaɪə/, AE /ˌɛgˌzɪˈstɛnʧəl ˈkwɑntɪˌfaɪər/

Definition

The existential quantifier (symbolized by the operator ∃) is used to mean that the statement is true of at least one entity in the domain and stands for expressions with a/an (one), some and there is.

Examples

A dog barked.
∃x (DOG (x) & BARK (x))
“There is at least one thing x such that x is a dog and x barked.”

Some birds were singing.
∃x (BIRD (x) & SING (x))
“There is at least one thing x such that x is a bird and x sings.”

References

• Gregory, Howard. 2000. Semantics. Language Workbook. London/New York: Rutledge.
• Riemer, Nick. 2010. Introducing Semantics. Cambridge [et al.]: Cambridge University Press.

Related Terms

• Logical Form
• Logical Operator (Propositional Connective)
• Logical Quantifier
• Predicate Logic (First-order Logic)
• Quantifier
• Restricted Quantifier
• Universal Quantifier
• Variable

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