Bivalence and related laws
In logic, the laws of bivalence, excluded middle, and non-contradiction are related, but not the same. This page discusses the differences.
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2 Bivalence is deepest 3 Why these distinctions might matter 4 External links |
The laws
For any proposition P, at a given time, in a given respect, there are three related laws:
- Law of bivalence: The proposition is either true or false.
- Law of the excluded middle: (P or not-P) is true.
- Law of non-contradiction: (P and not-P) is false.
Bivalence is deepest
It is possible to state the laws of non-contradiction and the excluded middle in the formal manner of the traditional propositional calculus:
- Excluded middle: P ∨ ¬P
- Non-contradiction: ¬(P ∧ ¬P)
It is, however, not possible to state the principle of bivalence in such a way, as the traditional propositional calculus just assumes sentences are true or false.
Why these distinctions might matter
These different principles are closely related, but there are certain cases where we might wish to affirm that they do not all go together. Specifically, the link between bivalence and the law of excluded middle is sometimes challenged.
Future contingents
A famous example is the contingent sea battle case found in Aristotle's work, De Interpretatione, chapter 9:
- Imagine P refers to the statement "There will be a sea battle tomorrow."
- There will be a sea battle tomorrow, or there won't be.
Vagueness
In fuzzy logic or other multi-valued logics dealing with vagueness, again it may be the case that (P or not-P) is true but P is not considered true or false. For example, suppose P is:
- Joe is bald.
- Joe is bald, or Joe is not bald.
External links
- The distinction between the three laws is described by Douglas Groothuis, in the Philisophical Dictionary (here and here), and by Peter Suber. The latter also defines a Principle of Exclusive Disjunction for Contradictories which is the logical conjunction of the Law of excluded middle and the Law of non-contradiction.
