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On the formalisation of indirect discourse

Published online by Cambridge University Press:  12 March 2014

R. L. Goodstein
R. L. Goodstein*
Affiliation:
The University, Leicester, England
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Extract

Mr. L. J. Cohen's interesting example of a logical truth of indirect discourse appears to be capable of a simple formalisation and proof in a variant of first order predicate calculus. His example has the form:

If A says that anything which B says is false, and B says that something which A says is true, then something which A says is false and something which B says is true.

Let ‘A says x’ be formalised by ‘A(x)’ and let assertions of truth and falsehood be formalised as in the following table.

We treat both variables x and predicates A (x) as sentences and add to the familiar axioms and inference rules of predicate logic a rule permitting the inference of A(p) from (x)A(x), where p is a closed sentence.

We have to prove that from

Type
Research Article
Information
The Journal of Symbolic Logic , Volume 23 , Issue 4 , December 1958 , pp. 417 - 419
Copyright
Copyright © Association for Symbolic Logic 1958

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References

1 This Journal, Vol. 22, no. 3 (1957), pp. 225–232.