A Proof Concerning Bradwardine's Theory: A Supplement to Insolubles (Stanford Encyclopedia of Philosophy/Summer 2004 Edition)

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Stanford Encyclopedia of Philosophy
Supplement to Insolubles
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A Proof Concerning Bradwardine's Theory

Here is a proof that on Bradwardine's theory, every proposition signifies that it is true. Let ‘P’ name the proposition replacing ’p.’ Then:

1. p Assume for conditional proof.

2. P signifies that q Assume for conditional proof.

3. p → q From 2 and the thesis that what propositions signify follows from them.

4. q From 1, 3, and modus ponens

5. (P signifies that q) → q From 2-4, by conditional proof.

6. P is true. From 5 and Bradwardine's definition of truth, since 5 is general with respect to propositions replacing ‘q’.

7. p → P is true From 1-6, by conditional proof.

8. P signifies that P is true. From 7 and "Bradwardine's Principle."

Return to note 19

Paul Vincent Spade
spade@indiana.edu

1.	p	Assume for conditional proof.
2.	P signifies that q	Assume for conditional proof.
3.	p → q	From 2 and the thesis that what propositions signify follows from them.
4.	q	From 1, 3, and modus ponens
5.	(P signifies that q) → q	From 2-4, by conditional proof.
6.	P is true.	From 5 and Bradwardine's definition of truth, since 5 is general with respect to propositions replacing ‘q’.
7.	p → P is true	From 1-6, by conditional proof.
8.	P signifies that P is true.	From 7 and "Bradwardine's Principle."

Stanford Encyclopedia of Philosophy Supplement to Insolubles Citation Information

A Proof Concerning Bradwardine's Theory

Supplement to Insolubles Stanford Encyclopedia of Philosophy

Stanford Encyclopedia of Philosophy
Supplement to Insolubles
Citation Information

Supplement to Insolubles
Stanford Encyclopedia of Philosophy