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Chenkai Wang
 
Chenkai Wang
  
It is an interesting question that whether some mathematical statement(s) can or cannot prove some other statement. To show a statement is provable, simply present a proof. But is there a way to show a statement is unprovable? For example, the Euclid's fifth postulate turned out to be unprovable from other postulates. Because one can find a geometry where all Euclid's postulates are ture (including the fifth) and another where all but the fifth are true. Since proof preserves truth one can say the fifth is unprovable. I am going to demonstrate a simple technique of showing the three axioms for propositional logic is independent from each other.
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It is an interesting question that whether some mathematical statement(s) can or cannot be derived from other statement(s). To show a statement is provable, simply present a proof. But is there a way to show a statement is unprovable? For example, the Euclid's fifth postulate turned out to be unprovable from other postulates. Because one can find a geometry where all Euclid's postulates are ture (including the fifth) and another where all but the fifth are true. Since proof preserves truth one can say the fifth is unprovable. I am going to demonstrate a simple technique of showing the three axioms for propositional logic is independent from each other.
  
 
The axioms for proposition logic are
 
The axioms for proposition logic are

Latest revision as of 11:19, 5 September 2013

Independence of Axioms of Propositional Logic

Chenkai Wang

It is an interesting question that whether some mathematical statement(s) can or cannot be derived from other statement(s). To show a statement is provable, simply present a proof. But is there a way to show a statement is unprovable? For example, the Euclid's fifth postulate turned out to be unprovable from other postulates. Because one can find a geometry where all Euclid's postulates are ture (including the fifth) and another where all but the fifth are true. Since proof preserves truth one can say the fifth is unprovable. I am going to demonstrate a simple technique of showing the three axioms for propositional logic is independent from each other.

The axioms for proposition logic are

1. $ \varphi\rightarrow(\psi\rightarrow\varphi) $

2. $ (\varphi\rightarrow(\psi\rightarrow\chi))\rightarrow((\varphi\rightarrow\psi)\rightarrow(\varphi\rightarrow\chi)) $

3. $ (\lnot\varphi\rightarrow\lnot\psi)\rightarrow(\psi\rightarrow\varphi ) $

Alumni Liaison

Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett